tag:blogger.com,1999:blog-7235079070508727662024-03-20T07:26:22.531+00:00impresionesmiguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.comBlogger193125tag:blogger.com,1999:blog-723507907050872766.post-62967061611683160792013-01-03T16:35:00.001+00:002013-03-05T19:12:20.894+00:00OTRA HISTORIA DE LA OROTAVA: DE PERIÓDICOS (II)<!--[if gte mso 9]><xml>
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<span style="font-size: small;">Tal y como señalábamos en la entrega anterior la aventura periodística del <i>Hogar Club</i> finalizó tras varios rifirrafes con la curia y en Septiembre de 1965 sacamos a la luz, al margen de toda relación y tutela
eclesiástica, una nueva publicación con la cabecera de AHORA. En la empresa
participamos activamente, Domingo Eulogio, Melchor García, Francis Miranda, Chela,
Juan Cruz y yo mismo. En los dos únicos números que vieron la luz se podía
detectar un inconformismo que anunciaba otros “aires” y que ya había tomado
cuerpo en una actividad que se desarrollaba en paralelo: el Cine Club.</span></div>
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<span style="font-size: small;">El primer número se abría con un <i>Saludo y estímulo</i> que Juan Cruz había conseguido que nos escribiera
el prestigioso periodista Luis Castañeda. En él, leído con la perspectiva de
los años, nos animaba en la empresa que iniciábamos e, incluso, abogaba por una
renovación generacional afirmando:</span></div>
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<span style="font-size: small;"><i>Porque en
nuestro país ésta es una hora de juventud. Tanto que yo vengo sosteniendo en
conversaciones privadas, con hiperbólica y desesperada anatematización, que
para despejar con rapidez el futuro destino de nuestro pueblo, es preciso que
desde migeneración para atrás desaparezcamos todos del escenario social. Con
esto quiero sugerir que por nuestra rutinaria visión de las cosas, por los
tardígrados movimientos que imprimimos a la sociedad, por el peso muerto con
que retardamos la evolución de la historia, por la resistencia que deliberada o
mecánicamente oponemos a la reestructuración más justa y más ágil de la vida
pública, representamos un estorbo para las aspiraciones nobles, generosas y
apremiantes de la juventud.</i></span></div>
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<span style="font-size: small;"><i>[…] Con esta
revista la juventud tiene ahora en el Valle de la Orotava una plataforma para
cumplir el predicado unamuniano de llamar mentiroso al que miente, ladrón al
que roba y estúpido al que va por ahí diciendo estupideces. Y esto ya sería
bastante como quehacer premioso de su impaciencia.</i></span></div>
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<span style="font-size: small;"><i> </i> </span></div>
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<span style="font-size: small;">Que acabara la soflama mentando al indomable vasco,
por aquél entonces guía espiritual de algunos de nosotros, fue con toda
probabilidad lo que desató nuestra (mi) destemplada reacción.</span></div>
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<span style="font-size: small;">El segundo, y último número, se abría con un artículo
bajo el elocuente título de <i>Cantos de
sirena</i>.</span></div>
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<span style="font-size: small;"><i>La lectura
del artículo “Saludo y estímulo”, por Luis Castañeda, publicado a manera de
pórtico en el número 1 de este periódico, ha llenado mi alma, hecha no de cera,
y así incapaz de sentir y sí de amoldarse, de profunda irritación. Irritación y
desánimo es lo que me produce ese saludo y estímulo, que si es sincero, como así
creo, pues no quiero ni tengo por qué dudar de ello, indica en su autor una
ceguera intensa, acaso disculpable caso de tratarse, como así me parece, de idealismo
quijotesco.</i></span></div>
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<span style="font-size: small;">Parece claro que la lectura de la unamuniana <i>Vida de D. Quijote y Sancho </i>está
reciente en el ánimo del autor, quien prosigue:</span></div>
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<span style="font-size: small;"><i>Nada sé de
los motivos que ha tenido D. Luis para decir de nosotros, los jóvenes, “que
vivimos en perpetuo afán de navegación”, “que es tanta nuestra ambición de
conocimiento, que quisiéramos abarcar el mundo por la cintura, y tanto nuestro
deseo de perfección que estamos predispuestos al holocausto en aras de todas
las causas que creemos justas y redentoras” </i></span></div>
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<span style="font-size: small;">Debo reconocer, incluso hoy día, que el
bienintencionado periodista se excedió en sus loas; no me extraña, pues, que
con la exaltación del momento, continuara mi requisitoria en los términos que
siguen:</span></div>
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<span style="font-size: small;"><i>Nada sé de
sus motivos, ni nada puedo saber. Sólo se me ocurre achacárselos a esa ceguera
“quijotesca” que llevó al Caballero de la Triste Figura a confundir rameras con
doncellas, o molinos de viento con gigantes. Pero no puedo permanecer callado,
tengo que sacarlo de su error y decirle que somos lo primero, que es nuestra
desgracia ser rameras y no doncellas, que no deseo oir música de sirenas y
dejarme seducir por ella.</i></span></div>
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<span style="font-size: small;"><i>Sé que vivo
–y así la mayoría– al tibio calor del estercolero, lleno de hediondez; pero no
me confunda, no confunda la mofeta con el armiño; no necesito una palabra de
consuelo, una limosna, quiero un empujón, un bofetón que me despierte de mi
letargo.</i></span></div>
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<span style="font-size: small;">Después de asegurar que no era mi intención polemizar
y de agradecer su saludo y estímulo, <i>palabras
que agradezco pero que no me sirven,</i> elevaba el tono de la soflama ya
claramente unamuniana.</span></div>
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<span style="font-size: small;"><i>Si vamos a
continuar vistiendo la verdad desnuda con ropas de bufón, para hacer gracias,
adular a los intocables o no escandalizar a los santones de turno, muy corta
será nuestra existencia, existencia que merezca la pena.</i></span></div>
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<span style="font-size: small;"><i>Creo y veo
que es necesario, para salir de esta vileza que nos aturde, mirar la vida cara
a cara, apartar lo que estorbe, descorrer el velo y decir: ¡Esto es así!, puede
que no te guste, pero ¡esto es!</i></span></div>
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<span style="font-size: small;"><i>Ver las cosas
de frente, buenas y malas, ese es el ideal; te diré lo que para mí eres; si te
envidio o te odio te lo haré saber. ¡Haz tú lo mismo conmigo!</i></span></div>
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<span style="font-size: small;"><i>La suciedad
oculta en los rincones es la más difícil de barrer; ¿por qué llenar, entonces,
nuestra alma de rincones? Aventarla, pregonando la verdad, ¡mi verdad!, ¡tu
verdad! Así el viento se la llevará lejos, lejos de ti y de mí; podremos, por
fin, vernos, desnudos, tal como somos, sin velos.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">El artículo lo terminaba con un “aviso para
navegantes”:</span></div>
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<span style="font-size: small;"><i>Un periódico
como el nuestro, que aspira –por lo menos oficialmente– a sacar de este mar de
tibieza a nuestro Valle, no puede comenzar tratando los temas con evasivas; no
puede ni debe dejar de decir la verdad, esa verdad por la que tanto suspiramos.</i></span></div>
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<span style="font-size: small;"><i>Rectificar es
de sabios y ahora se está a tiempo, pues si los artículos van a ser una suave
rienda que continúe conduciendo nuestro apático caballo por caminos trillados,
en vez de un recio latigazo que lo haga galopar, preferible es que callemos.</i></span></div>
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<span style="font-size: small;">Imagino al pobre Juan Cruz intentando dar explicaciones
a D. Luis Castañeda; entiendo, pues, su reacción de negarse a vender el
periódico en el Puerto de la Cruz.</span></div>
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<span style="font-size: small;">La aventura acabó con este número; una aventura que
nos deparó momentos inolvidables y polémicas de una ingenuidad entrañable.</span></div>
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<span style="font-size: small;">Este segundo número incluía una carta de Andrés Chaves
en la que después de dejar constancia que había leído <i>con inusitado asombro</i> un artículo de Francis Miranda titulado <i>El tremendismo actual</i> concluía: </span></div>
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<span style="font-size: small;"><i>Claro que
todos tenemos nuestras teorías y el señor Miranda es un idealista a
machacamartillo (sic) al afirmar que añora la sencillez y dulzura de las
publicaciones de Juan Ramón Jiménez que con sus melosas palabras nos hace dormir
estáticos en una nube ignorando la cruel realidad.</i></span></div>
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<span style="font-size: small;"><i>Menos mal que
el garrotazo brutal de Cela o Williams nos hace bajar de esa nube y
demostrarnos con un inmenso chichón que el mundo no es precisamente un burrito
llamado Platero y rosas, rosas, rosas…</i></span></div>
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<span style="font-size: small;">De todas las historias que vivimos mientras
redactábamos el periódico es digna de reseñar la de una usurpación de la que
fuimos conscientes en nuestro fuero interno cuando recibimos dos artículos que
firmaba Juan Carlos Arencibia; uno de ellos era producto de su pluma –una
birria que desechamos– pero el otro, ¡ah!, el otro era diferente, ¡otra cosa!
Se titulaba <i>La libertad del otro</i> y
comenzaba así:</span></div>
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<span style="font-size: small;"><i>La libertad
del otro constituye el fundamento de mi libertad. Sin su libertad yo no soy
libre. La razón de ser de mi libertad he de buscarla en el otro.</i></span></div>
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<span style="font-size: small;"><i>La oposición
entre el otro y yo es más aparente que real, más ficticia que auténtica. A lo
que verdaderamente se opone el otro es a lo otro.</i></span></div>
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<span style="font-size: small;"><i>De un hombre
a otro va apenas nada. Un hombre se diferencia o distingue de otro hombre por
la visibilidad de las sombras que proyectan sus pasos.</i></span></div>
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<span style="font-size: small;">Y así continuaba varios párrafos más, hasta concluir
de esta guisa:</span></div>
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<span style="font-size: small;"><i>Así pues, la
libertad del otro es la que me dice de manera expresa si gozo yo de libertad o
si vivo esclavo de una obstinante (sic) superioridad. Es pues tan necesaria la
existencia del otro que necesito de ella para ser yo mismo.</i></span></div>
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<span style="font-size: small;"><i>El respeto a
la libertad del otro no es una virtud, ni un obsequio, sino que constituye un
elogio a nosotros mismos. Lo que sucede es que el respeto a la libertad ha de
ser tan amplio y generoso como corresponda a la misión y a la función que cada
uno cumpla o ejerza en la vida.</i></span></div>
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<span style="font-size: small;">Algunas de las frases, sobre todo las del comienzo,
quedaron grabadas en nuestra memoria, por ello pude, al fin, descubrir al
verdadero autor de las mismas cuando, muchos años después, leyendo <i>Dios y el Estado</i> de Bakunin, me topé con
un discurso que incluía párrafos como los que siguen:</span></div>
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<span style="font-size: small;"><i>La libertad
de otro, lejos de ser un límite o la negación de mi libertad es, al contrario,
su condición necesaria y su confirmación. No me hago libre verdaderamente más
que por la libertad de los otros, de suerte que cuanto más numerosos son los
hombres libres que me rodean y más vasta es su libertad, más extensa, más
profunda y más amplia se vuelve mi libertad.</i></span></div>
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<span style="font-size: small;">Nunca entendí, sin embargo, cómo llegó Juan Carlos,
que transitaba por territorios bien alejados de cualquier veleidad anarquista,
a ese texto – ¿un viejo libro de la época republicana que escapó de la purga
franquista?</span></div>
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<span style="font-size: small;">El tercer número no vió nunca la luz por falta de recursos, pese a estar casi montado en la imprenta...</span></div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-17587372836690608522012-12-23T18:34:00.001+00:002012-12-23T19:28:03.591+00:00OTRA HISTORIA DE LA OROTAVA: DE PERIÓDICOS (I)<!--[if gte mso 9]><xml>
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<span style="font-size: small;"> De <span style="font-size: small;">las </span>actividades<span style="font-size: small;"> desarrolladas</span> durante distintas
épocas de mi vida forma parte importante la edición de periódicos
–probablemente la razón haya que buscarla en mi vocación irrealizada de
escritor y configurador de opinión.</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"> Mis primeras experiencias periodísticas
tuvieron lugar en el que bajo el nombre, de claras resonancias eclesiásticas, HOGAR
CLUB, se editó a finales de 1964 –lo dirigía Pedro Cruz Sacramento, hombre
vinculado desde esa época al cristianismo social. Tenía yo entonces 18 años y
ya había iniciado mi aventura madrileña, como queda reflejado en el listado de
articulistas del primer número donde aparezco así: Miguel Hernández, 2º de
Física. </span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">El artículo con el que me estrené, <i>Ellas</i>, produce sonrojo al leerlo.
También, excepción hecha de lo escrito por José H. “Chela”, la mayor parte de
lo que se incluyó en los cuatro números que aparecieron. Entusiasmo sí que
había y una cierta voluntad de modificar –¡dentro de ciertos cauces!– una
realidad insatisfactoria.</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"> La declaración de intenciones con la
que se abría el primer periódico, bajo la rúbrica de Tesorero, Melchor Dorta,
no ofrece dudas sobre el territorio en el que se movía el Hogar Club:</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"> <i>Estimados
lectores y amigos todos.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i> Quisiera
como encargado de la presentación del Hogar Club, de formación tan reciente que
aun no ha llegado a oídos de muchos jóvenes de La Orotava, exponerles
claramente lo que es o lo que será el Hogar Club, teniendo en cuenta, claro
está, mis escasas cualidades literarias.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i> El
motivo de su fundación se debe, en gran parte, a contar desde el principio con
el ofrecimiento estimulante de un local apropiado, donde encontrarmos una base
sólida en la que materializar nuestra idea, que consiste en conseguir el
acercamiento de los jóvenes de La Orotava.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i> Es
de mencionar que esta idea no partió exclusivamente de los jóvenes sino también
de algunas personas mayores que, con su consejo y apoyo, han contribuido a que
ésta sea una próxima realidad que satisfaga plenamente todas nuestras
esperanzas.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i> Pero
aparte de esta, yo añadiría que puede considerarse como otra causa el vernos
apoyados y el haber sido correspondidos en todo momento de una manera elogiable
por todos los miembros que forman actualmente el Hogar Club, ya que sin su
ayuda, todas nuestras ilusiones se hubiesen derrumbado.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Es fin del
Club conseguir que los jóvenes de la Orotava puedan ampliar su formación, en
toda la acepción de la palabra; desea también fundir en uno solo a todos los
grupos en los que desgraciadamente está dividida la juventud de esta Villa.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>El Hogar Club
es un lugar en donde se acoge a todos los jóvenes –chicos y chicas– que con
buena intención acudan a él con el deseo de practicar sus aficiones preferidas.</i> </span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">Después de una enumeración de las actividades que se
pretendía desarrollar en el Club, concluía la presentación con un deseo:</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>En nombre de
la Directiva del Hogar Club quisiera rogarles su cooperación para que todos
estos objetivos no sean pura utopía sino con la ayuda de Dios, una próxima y
feliz realidad.</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i> </i>El
caserón en el que se ubicaba el Hogar Club no era otro que el que había acogido
en su momento al “Avecren”, nombre con el que calificábamos a un extraño colectivo
de mayores que, tras unos Ejercicios Espirituales, habían cambiado sus
costumbres y pretendían cambiar las de los demás – grupo al que considerábamos
el <i>summun</i> de la hipocresía y al que
pertenecían notorios personajes de la sociedad orotavense de entonces como
Pedro Méndez o Domingo Jiménez. Estaba, pues, vinculado a la Iglesia y era
ésta, por mediación de los jóvenes militantes de la Acción Católica –Pedro “el
Chatarra” (Presidente del Hogar Club) y Francisco Mesa Bravo entre otros–, la
que pretendía ejercer su influencia apostólica sobre los jóvenes.</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">No es extraño que alguno de los más lúcidos, como “Chela”,
expresara sus dudas sobre el tono del Hogar Club en un artículo que lo iba a
enfrentar con el por entonces párroco de La Concepción, Leandro Medina.</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">Decía el primero en una sección que titulaba <i>Pedacitos de turrón…del duro</i> y que
firmaba con el seudónimo de<i> Veolof</i>:</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>El peor
pecado es la hipocresía. Y hay que decirlo: Aquí, en el Hogar Club y en el
periódico, vamos pecando, ¡eh!, vamos pecando.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Modelo de
razonamiento de una muchacha del Hogar Club: “De acuerdo, el Hogar Club es para
todas las clases sociales, pero una cosa es que sea para todas ls clases
sociales y otra que entre todo el mundo”. Oído por mí, así. Sin comentarios.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>¿No va siendo
hora de que ciertos señores que escriben en este periódico se quiten su
aureolita de santurrones y se muestren tal y como son? Yo creo que sí, porque
hay que ser bueno, malo o mediocre; pero serlo con valentía. Sin caretas.</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Porque, vamos
a ver: “esto” ¿es el órgano informativo del Hogar Club o una revista de orientación
religiosa?</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>En resumen:
el Hogar Club no es lo que algunos esperábamos que fuese. Y, el periódico,
tampoco.</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">El Arcipreste no estaba dispuesto a dejar sin
respuesta la osadía del ya por entonces cáustico “Chela” y en un artículo, sin
firma, para así implicar a la directiva del Hogar Club, titulado <i>Para ti, “Veolof”. Sólo para ti</i>, dejaba
claras sus ideas:</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Es valiente
el que escribe construyendo, a pesar de ver sus propios defectos. No es
hipócrita, a no ser que se ponga a sí mismo como modelo. Quizás al escribir
delinee su propio deseo de perfección.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>En cambio es
cobarde el que todo lo critica, el que encuentra hipocresía en todo y en todos.
Y más cobarde cuando al criticarlos, se pone la careta del seudónimo, y pide a
los demás que se la quiten.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Estos
pedacitos de turrón tienen sabor de almendra amarga.</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>En torno a
los “pedacitos de turrón” se reune la familia toda para saborearlos. Pero
“estos”…espantan a la familia en vez de unirla.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Ya que te has
puesto cristales de color ante los ojos, ¿por qué has elegido el negro
precismente?</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Es chocante
que los jóvenes se quejen siempre de la “incomprensión” de los mayores …y
luego…sean intransigentes con los propios compañeros.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Si crees que
este no es el camino, trázanos tú una meta y deja que todos contemplemos y
admiremos tu acierto. ¡Ah! y ayúdanos a seguirla.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Tú defines
que el peor pecado es la hipocresía. Yo –opinión modesta y particular– creo que
el peor pecado es “creer hipócritas a los demás”, porque eso es soberbia, y la
soberbia no sólo es el peor pecado, sino que es el origen de todo pecado.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>Parece que te
molesta que salga a relucir el problema religioso en el periódico, que es
periódico de problemas de la juventud… Eso demuestra que también los jóvenes
son hombres, porque el hombre es “un animal religioso”. Si le quitas al joven
la religión, dime ¿a qué queda reducido?</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>También te
molesta el que el periódico y el Hogar no estén hechos a tu medida –“no es lo
que algunos esperábamos”– ¿Qué es lo que tú esperabas? Y lo que tú esperabas,
¿es seguro que es lo mismo que esperaban todos los demás? Además, ¿qué quieres?
¿Qué todos seamos tan perfectos como tú, a la primera…? En el camino estamos, y
deseos no faltan.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><i>El tiempo, la
buena voluntad, la colaboración y la unión, a pesar de las divergencias, harán
lo que hoy es un deseo. Paciencia, chico. </i> </span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">El cura no escondía sus ideas y el lenguaje era
inequívoco: <i>El hombre es “un animal
religioso”. Si le quitas al joven la religión, dime ¿a qué queda reducido?</i></span><br />
<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">Las reticencias de "Chela" eran compartidas por algunos de los que participábamos en el periódico y buena prueba de ello es que en Septiembre de 1965 sacamos a la luz, al margen de toda relación y tutela eclesiástica, una nueva publicación con la cabecera de AHORA.</span></div>
<br />
<br />
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">De esta aventura hablaremos en la próxima entrega.</span></div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-22043334220247496002012-12-13T17:13:00.001+00:002012-12-13T17:36:15.596+00:00REFLEXIONES EN TIEMPOS REVUELTOS<br />
<br />
<div style="text-align: justify;">
La irrelevancia de la política -¡al menos la española!- para gestionar la crisis conlleva una creciente desafección hacia los que protagonizan aquella; pagados para hacer más llevadera la vida de la ciudadanía, los percibimos (a veces con razón) no sólo como incapaces para desarrollar esa misión sino como agentes de nuestra desazón, incomodidad y penuria. ¿Extraña, pues, que se conviertan en blanco de nuestra ira?</div>
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<div style="text-align: center;">
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjRmiC4i8pOZOv5InvuXb1ChvrkOrVxfnDVYp51FFy4iXT6rzic0wgWQ4xJ1i-Ga1XsJzgpmIGU0RRMc96_II3AlDzEqXbRv1ftvW8rBSJy4raSMZxc8IZBo-SiJCfmCniB3uRvb3cTlRo/s1600/adelson.jpeg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="133" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjRmiC4i8pOZOv5InvuXb1ChvrkOrVxfnDVYp51FFy4iXT6rzic0wgWQ4xJ1i-Ga1XsJzgpmIGU0RRMc96_II3AlDzEqXbRv1ftvW8rBSJy4raSMZxc8IZBo-SiJCfmCniB3uRvb3cTlRo/s320/adelson.jpeg" width="320" /></a></div>
<div style="text-align: justify;">
<br />
Cuando se está en una situación de emergencia se sacrifican los principios y lo que hasta entonces parecía inasumible muta y acaba siendo deseable; se envilece, así, el clima moral y la sociedad se gangrena. El espacio público es colonizado por los oportunistas y desaprensivos y desaparecen los límites, el pacto social pierde efectividad y la jungla invade la <i>polis.</i></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhFPmlrDCPfSDJwkHg0WBsTNmKS8IzhXPXLTm6rwPg-Ai6yCN9re_TVR4uEq0AItKcUuaiYN0DLOuzmlscokPc4bUVjN4ROVcyvZ3II3RdbU9w5NbIvv0980xTfQv6KoKNbq1mrFhzgGFM/s1600/goya.jpeg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="153" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhFPmlrDCPfSDJwkHg0WBsTNmKS8IzhXPXLTm6rwPg-Ai6yCN9re_TVR4uEq0AItKcUuaiYN0DLOuzmlscokPc4bUVjN4ROVcyvZ3II3RdbU9w5NbIvv0980xTfQv6KoKNbq1mrFhzgGFM/s320/goya.jpeg" width="320" /></a></div>
<div style="text-align: justify;">
<br />
No hay forma de debatir de modo sosegado en este país; el argumentario de las facciones está escrito y modificarlo se considera una derrota; no se confronta, pues, para mejorar las posiciones de partida, para matizar y enriquecer las tesis sino para aplastar al oponente, porque lo que está en juego no es el beneficio de los representados sino el poder de los representantes.</div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh8o4729NYW4U4zb0Ee1z603p-gPOwLh3PUoF6uX1GVdtyfrzgSA84Gi14Au2dRyTTSj7nscXnc-aMyBOwODqw6IG7qPvW0IIjBm-acLG4z5RwTJIlaaAWbnUZFaGU7qFGKPbUiCQAs8sc/s1600/esquerra.jpeg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh8o4729NYW4U4zb0Ee1z603p-gPOwLh3PUoF6uX1GVdtyfrzgSA84Gi14Au2dRyTTSj7nscXnc-aMyBOwODqw6IG7qPvW0IIjBm-acLG4z5RwTJIlaaAWbnUZFaGU7qFGKPbUiCQAs8sc/s1600/esquerra.jpeg" /></a></div>
<div style="text-align: justify;">
<br />
Sorprende -¡entiéndase la sorpresa como simple recurso retórico!- la rapidez con la que Esquerra Republicana de Catalunya ha aparcado su exigencia a Mas de abandono de la política de recortes para pactar el apoyo a su gobierno a cambio de una concreción clara de la agenda soberanista. Se muestra con claridad que el izquierdismo de esa formación política no es otra cosa que un ropaje de "quita y pon" con el que cubrir su auténtica esencia: el independentismo.</div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhRKdJ8j3x4Grp96j0jZN5-bHdFkUg7fXlTCjkXBCB4oyBCfMF2TUGyYVjsQA7y_B2C6-xLD8AZqax4R41ecVUq6Aq-SdEqsqprQZc3QSDpLxuHnfY3sXSPC19jtKSD55PRSYcXIoGBI0M/s1600/gallardon_cara_bobo.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhRKdJ8j3x4Grp96j0jZN5-bHdFkUg7fXlTCjkXBCB4oyBCfMF2TUGyYVjsQA7y_B2C6-xLD8AZqax4R41ecVUq6Aq-SdEqsqprQZc3QSDpLxuHnfY3sXSPC19jtKSD55PRSYcXIoGBI0M/s1600/gallardon_cara_bobo.jpg" /></a></div>
<div style="text-align: justify;">
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La forma en que el gobierno del PP gestiona los asuntos públicos muestra no sólo los peligros que comporta la mayoría absoluta sino, también, el talante de esta formación. Máximos exponentes de este estilo de hacer son los titulares de Educación y Justicia -aquellos a los que <i>a priori</i> se conceptuaba inicialmente como más dialogantes y modernos. Wert y Gallardón destacan no sólo por su habilidad para enfurecer a los colectivos sobre los que tienen competencias y por su escasa capacidad para consensuar acuerdos sino por el narcisismo y la chulería de la que hacen gala -ambos son, además, expertos en envilecer y retorcer el lenguaje y despreciar, así, la inteligencia de los ciudadanos. <br />
<i></i></div>
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<i> </i> </div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-70122427606064799102012-12-08T17:35:00.002+00:002012-12-10T18:30:48.102+00:00A PROPÓSITO DE LOS DESAHUCIOS<br />
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<a href="http://m1.paperblog.com/i/153/1535245/suidicios-desahucios-sangre-ha-llegado-L-RVAFdS.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="214" id="il_fi" src="http://m1.paperblog.com/i/153/1535245/suidicios-desahucios-sangre-ha-llegado-L-RVAFdS.jpeg" style="padding-bottom: 8px; padding-right: 8px; padding-top: 8px;" width="320" /></a></div>
La alarma social que los desahucios han generado me ha recordado un episodio –con este grave asunto como protagonista– que tuvo lugar en los convulsos tiempos de nuestra transición política y que me ha parecido oportuno evocar.<br />
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<br />
Aquella situación tenía tintes surreales: ¡una familia –padre, madre y seis hijos– ocupaba una de las salas del piso alto del Ayuntamiento y hacía vida allí!
Los tiempos confusos y convulsos que siguieron a la muerte del dictador, durante los que se procedió a la articulación de lo que acabaría etiquetándose bajo el nombre de la Transición, posibilitaron, en toda la geografía de nuestro país –¡también en nuestro municipio!– actuaciones que bajo el franquismo resultaban impensables. La que habían protagonizado “los okupas” con los que hemos iniciado estas notas es una de ellas.<br />
<br />
“El Aguijón”, periódico nacido en diciembre de 1978, bajo el paraguas de la Asociación Cultural Valle de La Orotava, daba cuenta, en un artículo titulado<i> “El desahucio, una injusticia social más” </i>del número de marzo del 79 dedicado a las inminentes elecciones municipales, de unos hechos que iban a traer cola.<br />
<br />
El autor, Nicolás G. Lemus, uno de los miembros más activos del grupo editor y por aquel entonces Presidente de la Asociación de Vecinos 24 de Junio de la Villa de Arriba, escribía:
<i>El 12 de febrero, en la Villa Arriba, concretamente en la calle de San Juan, tuvieron lugar unos hechos que, a estas alturas de siglo, creíamos desaparecidos.
Las camas, calderos, sillas, armarios, etc., de una familia compuesta por un matrimonio y seis hijos acupaban la calle. Se procedía al desahucio de unos vecinos del mencionado barrio.
Las razones del mismo no fueron ni la falta de pago ni otras achacables a ellos sino razones de índole legal que nosotros no cuestionamos.
</i><br />
<br />
Recuerdo con nitidez los hechos que se relatan dado que compartí con el firmante del artículo toda la historia, como corresponsable del Aguijón, como Vicepresidente de la Asociación de Vecinos y como compañero de militancia en el PCE. A ello debo añadir que el cabeza de familia desahuciado era Pepe, uno de mis primos hermanos argentinos.<br />
<br />
En calidad de responsables de la Asociación de Vecinos estábamos al tanto de la fecha del acto de desahucio y allí nos presentamos tratando, sin éxito, de impedir su materialización. Realizado el desahucio intentamos, a lo largo de esa tarde, encontrarles acomodo –el Alcalde predemocrático Juan Antonio Jiménez estaba de viaje y nadie se hacía responsable de lo que pudiera sucederle al matrimonio y su prole.<br />
<br />
Creo que, a sugerencia de uno de los guardias municipales encargados de mantener el orden en lo que devino todo un acontecimiento, acabamos dirigiéndonos, ya anochecido, a la casa del teniente alcalde D. Manuel Barrera –concejal de la “hornada del 64”, en la Perdoma donde ejercía como maestro. Golpeamos la puerta, sin obtener respuesta, y a continuación la ventana; de ella emergió un malencarado y malhumorado edil que, embutido ya en su pijama, trató, en primera instancia, de escurrir el bulto. Nuestra insistencia y la vívida descripción de unos niños dispuestos a pernoctar a las puertas de entrada, bajo los soportales, del Ayuntamiento le obligó a ceder y tras llamar a la Comisaría de Policía autorizó a que se nos franquearan las puertas de la Casa Consistorial.
Con el temor de que, al reflexionar sobre el alcance de esta decisión, revocara la orden volvimos a toda prisa al lugar donde nos esperaban los desahuciados; con ellos y con dos guardias que abrieron las puertas entramos en el Ayuntamiento. Las órdenes no debieron ser muy precisas y claras porque ante nuestro rechazo a que se les ubicara en un cuarto de la entrada –esgrimiendo razones de humedad e insalubridad para los pequeños– conseguimos que se instalaran en el piso alto, en la zona más noble del edificio.<br />
<br />
Una vez asentados allí el problema iba a adquirir una repercusión más amplia sirviendo como elemento de agitación política; así, un mes más tarde, en plena campaña electoral, nos permitiría convocar, en la sala que albergaba no sólo a la familia sino también sus enseres, colchones, ropas, etc., una asamblea a la que invitamos a los cabezas de lista a la alcaldía por los diferentes partidos (la mayor parte de ellos declinó la invitación).<br />
<br />
En el artículo al que nos hemos referido más arriba se hacían ciertas consideraciones que están de rabiosa actualidad y bajo el epígrafe <i>Ante un desahucio, ¿qué hacer? </i>se decía:
<i> </i><br />
<br />
<i>Hasta hace poco tiempo se llevaba a cabo un desahucio y la única respuesta posible era la lamentación y la indignación por parte de la gente. Se consideraba que ante la actuación de la ley no se podía hacer nada; la familia desahuciada se recogía en la casa de algún familiar o buscaba desesperadamente donde pernoctar.
Esta actitud pasiva e ineficaz ante este problema pasó a la historia. La existencia de Asociaciones de Vecinos combativas en los barrios puede hacer que desaparezcan tales arbitrariedades... </i><br />
<br />
<i>La experiencia concreta de la Asociación de Vecinos 24 de Junio de la Villa de Arriba con el caso de desahucio que aquí comentamos es suficientemente ilustrativa. Sirve de precedente para demostrar que, ante un problema social como el que un desahucio pone de manifiesto, quedarse con los brazos cruzados no conduce a nada; que, por el contrario, sólo la presión decidida de los vecinos en el Ayuntamiento evita las injusticias. De ahí el apoyo decidido de nuestra Asociación a esta familia, así como su actitud resistente ante las autoridades, plantando su casa en los salones del Ayuntamiento. Estos factores han sido decisivos para la búsqueda de soluciones al problema. </i><br />
<br />
<i>Se ha demostrado que las Asociaciones de Vecinos que, de verdad, están dispuestas a la defensa de los intereses de las gentes de sus barrios son efectivas.</i><br />
<br />
Nicolás señalaba, además, en el mencionado artículo, por un lado, que <i>la dilatada permanencia de la familia en el Ayuntamiento era la única garantía para que no se echara tierra sobre el asunto y el problema se mantuviera vivo </i>–y así fue, dado que al final conseguimos que se los realojara en la Barriada de San Antonio– y por otro recriminaba a los partidos políticos su inhibición ante un problema social que los había desbordado preguntándose <i>¿estarán nuestros partidos preparados para resolver los miles de problemas sociales y políticos que padece nuestro pueblo de La Orotava? ¿Llegaríamos muy lejos, con la mentalidad de la que han hecho gala ante un problema social concreto?</i><br />
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<i> </i>
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A la luz de lo que ha sucedido después, estas reflexiones siguen manteniendo su vigencia.miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-47646954060948814632012-11-05T18:51:00.000+00:002012-11-08T12:40:07.120+00:00VIERA EN LA CIENCIA DE SU TIEMPO (V): LA HISTORIA NATURAL<!--[if gte mso 9]><xml>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi9j6iU-C7QlCZ20Qhq4VP85eBxkPzn9C8owMpTUgVX5U-zOaMn-Af0A9EAsrrVcElwz3BzHoFGfDqjSU_wHn10EB6wNbNJft3p_xbZc2St0Y05cD8nE95DTzvdvL59R7lF-_6M3IFb5Ss/s1600/viera+2.jpeg" style="margin-left: 1em; margin-right: 1em;"><span style="font-family: Arial, Helvetica, sans-serif;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi9j6iU-C7QlCZ20Qhq4VP85eBxkPzn9C8owMpTUgVX5U-zOaMn-Af0A9EAsrrVcElwz3BzHoFGfDqjSU_wHn10EB6wNbNJft3p_xbZc2St0Y05cD8nE95DTzvdvL59R7lF-_6M3IFb5Ss/s1600/viera+2.jpeg" /></span></a></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span>
<span style="font-family: Arial, Helvetica, sans-serif;">Es evidente que la
Historia Natural es el tema científico al que Viera dedicó una atención más
continuada y en el que sus aportaciones tienen mayor importancia. Así lo
atestigua no solo su obra magna, en este campo, <i style="mso-bidi-font-style: normal;">Diccionario de Historia Natural de las Islas Canarias, o Índice
alfabético descriptivo de sus tres Reinos animal, vegetal y mineral</i>, sino
también su opúsculo, <i style="mso-bidi-font-style: normal;">Librito de la
Doctrina Rural, para que se aficionen los jóvenes al estudio de la Agricultura,
propia del hombre </i>o el poema <i style="mso-bidi-font-style: normal;">Las
bodas de las plantas.</i> <i style="mso-bidi-font-style: normal;"><span style="mso-spacerun: yes;"> </span></i></span></div>
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<h3>
<span style="font-family: Arial, Helvetica, sans-serif; font-size: 14px;">Los sistemas de clasificación</span></h3>
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<span style="font-family: Arial, Helvetica, sans-serif;">Como apuntamos más arriba, la
física de Galileo, Descartes y Newton, así como la revitalización del atomismo
habían conseguido arrinconar<span style="mso-spacerun: yes;"> </span>a una
concepción del mundo, la aristotélica, profundamente teleológica, que se
apoyaba en una visión del funcionamiento del universo impregnada de nociones
biológicas. El finalismo de ésta dejará paso al mecanicismo que conlleva el
nuevo paradigma y éste se aventurará, incluso, en el terreno que menos propicio
le es: el dominio de lo vivo. Esta incursión no se saldará con excesivo éxito
pero sí servirá para abrir ciertas grietas en un ámbito hasta entonces
inexpugnable.</span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;">Durante esta época que
historiamos, lo que ahora conocemos como Biología, término introducido solo a
finales del siglo XVIII, no existía como tal, y, de hecho, para hablar de los
reinos animal, vegetal y mineral se usaba el término Historia Natural. <i style="mso-bidi-font-style: normal;">Historia natural, </i>– dice Hankins en su
libro <i style="mso-bidi-font-style: normal;">Ciencia e Ilustración </i>– <i style="mso-bidi-font-style: normal;">significa una pesquisa o investigación de la
naturaleza; y naturaleza, en el sentido aristotélico, significa esa parte del
mundo que está formada y que funciona sin el artificio del hombre. (...) por
consiguiente la historia natural abarca toda la gama de las formas observables,
desde los minerales hasta el hombre, excluyendo solamente aquellos objetos
fabricados por las manos del hombre y por su inteligencia. Su método es
descriptivo y su alcance enciclopédico.</i> </span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;">Este vasto territorio
aparecía sumido en la mayor de las confusiones y, al igual que sucedería con la
química, la claridad solo comenzaría a entreverse cuando se consiga construir
un lenguaje sencillo en el que hablar de los seres que lo pueblan y se
establezca cierto orden. Botánica, Zoología y Mineralogía necesitarán, pues,
sistematizarse y a esta tarea dedicarán sus esfuerzos numerosos naturalistas.
Si, incluso, en el campo de la física, científicos como Kepler tuvieron como
norte de su trabajo la búsqueda de los planos que el Creador había utilizado en
el diseño del Mundo, no puede sorprendernos que en el ámbito de la historia
natural se actuara guiados por el mismo impulso: el objetivo de los
naturalistas del siglo XVIII fue, así, encontrar un sistema natural que
identificara las plantas y animales por sus esencias, es decir, por aquello que
los hacía ser lo que eran. Esta búsqueda del sistema natural, es decir la
determinación de la esencia de animales o plantas, era pues la búsqueda del
designio de Dios. La tarea no es sencilla y los sistemas pretendidamente
naturales, proliferan sin que se produzca el acuerdo entre los naturalistas;
alguno de ellos, como es el caso de Buffon, sostendrá incluso que todas las
clasificaciones no son otra cosa que artificios impuestos a la naturaleza por
nuestra mente. Al margen de esta crítica radical al empeño clasificatorio,
durante la Ilustración hubo dos bandos claramente enfrentados: el de los que
creían en la posibilidad de articular un sistema natural basado en una sola
característica y el de los que sostenían la necesidad de hacer uso de todo un
complejo de características. Joseph Pitton de Tournefort (1656 – 1708) y John
Ray (1627 – 1705) son, representantes significados de estas dos posiciones en
liza.</span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">Para el primero de ellos,
es la forma de la corola la que permite con facilidad agrupar y clasificar las
plantas, (así lo expresará Viera en <i style="mso-bidi-font-style: normal;">El
librito de la Doctrina Rural</i>:<i style="mso-bidi-font-style: normal;"> </i>[el
Sistema de Tournefort es]<span style="font-variant: small-caps;"> </span><i style="mso-bidi-font-style: normal;">el que da a conocer las clases de las
plantas por la figura de sus rosetas, como si son campanudas, aclaveladas, amariposadas,
aparasoladas, azucenadas, etc.</i>),<i style="mso-bidi-font-style: normal;"><span style="font-variant: small-caps;"> </span></i>en tanto que el segundo – influido
por la filosofía lockeana para la que el conocimiento de la naturaleza se
obtiene a través de los sentidos, mediante colecciones de sensaciones, ninguna
de las cuales es la esencia del objeto percibido – fundaba su sistema, que sólo
podía ser en todo caso, por esa imposibilidad de captar la esencia de las
plantas (o animales), probablemente natural, en multitud de caracteres, entre
ellos la naturaleza del fruto y el número de cotiledones de la semilla. La
aparente sencillez del primero contrastaba con la dificultad que entrañaba
ubicar una planta en el segundo. </span></div>
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<span style="font-size: x-small;"><span style="font-family: Arial,Helvetica,sans-serif;">Linneo debe su fama como
naturalista no a sus precursoras aportaciones en ecología, fitogeografía,
dendrocronología e, incluso, en evolucionismo sino fundamentalmente a la
introducción de una nomenclatura binomial coherente y extremadamente útil para
clasificar animales y plantas y ello pese a que este logro no fue otra cosa que
un subproducto de su enciclopédica tarea de colocar en un esquema coherente y
conciso los métodos de identificación y catalogación de animales y plantas. Es
cierto que el empleo de nombres compuestos de dos palabras para diferenciar, en
la clasificación de objetos, lo general (el grupo entero) de lo particular (el
elemento singular de ese grupo) tenía una larga tradición pero es a Linneo al
que se debe por primera vez la utilización deliberada y precisa de este sistema
a los seres vivos de un modo conjunto. Por ello los botánicos aceptarán como
fecha clave de creación de la nomenclatura que aún utilizan la de 1753, momento
en que se publica el <i>Species Plantorun</i>,<i> </i>y los zoólogos la de 1758, año en el
que se editó el volumen I del <i>Systema
Naturae.</i></span></span></div>
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<span style="font-size: x-small;"><span style="font-family: Arial,Helvetica,sans-serif;">Linneo era un científico
eminentemente práctico y realista y con esta mentalidad enfrentó el problema de
poner orden en el caótico mundo de los seres vivos. Consciente de que una <i>clasificación
natural</i> – aquella que hace uso de un gran número de caracteres asociados –
representa una meta deseable, pero inalcanzable porque, como muy bién
entendería Buffon, diluye las diferencias, opta por una <i>clasificación</i> que, a juicio de la mayoría de los naturalistas,
incluso de la época, es<i> artificial </i>– en la que se escogen unos
pocos caracteres fácilmente observables – con la que se gana en sencillez. Los
caracteres escogidos por Linneo tienen como sustrato los órganos sexuales de
las plantas (Viera lo sintetiza así, en el <i>Librito
de la Doctrina rural </i>antes mencionado: <i>(...)
es el más seguido, y da a conocer las Clases de las plantas por el número de
sus estambres, y los órdenes por el de sus pistilos. Llámase sistema Sexual,
porque los estambres son evidentemente los machos que fecundan a los pistilos,
que son las hembras, sin cuyas bodas no hay fructificación... Pero dejemos esto
para la Botánica</i>). Como señala William T. Stearn: <i>Los grandes grupos linneanos son a todas luces artificiales, se
fundamentan ante todo en el número de elementos florales, pero la disposición
de los géneros en estos grupos artificiales es con frecuencia totalmente
natural, reuniendo los géneros que más se asemejan por la suma de sus
caracteres. </i></span></span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span>
<span style="font-family: Arial, Helvetica, sans-serif;">La polémica continuará en
pleno siglo XVIII y así, Michael Adanson (1727 – 1806) dirá en relación a este
tema: <i>Las clasificaciones botánicas que
únicamente consideran una parte o un pequeño número de partes de las plantas
son arbitrarias, hipotéticas y abstractas, y no pueden ser naturales (...) Sin
duda, el método natural en botánica solo puede conseguirse teniendo en cuenta
la colección de toda la estructura de la planta</i>; en tanto que Linneo
sostendrá, por el contrario: <i>(...) la
división sistemática de las plantas debe tomar como base la estructura
primaria. Por consiguiente, como la naturaleza confirma que la fructificación
es el único fundamento sistemático de la botánica, puede demostrarse que es el
fundamento absoluto. </i> </span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEij-rjQ3KEUEeEJZHIuZGxxCr5FDLmKj8ex8XFeHG-hve0LfhstEvnbDu6kNEISHPKwIDYdRxzeFk-Nwa0dAGOQM6PMITs7qRfe7S9QuuO5CxS77WCJxU2S2JgdtMeEGoDLwP-bw4Uf1Vo/s1600/linn_ros.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><span style="font-family: Arial, Helvetica, sans-serif;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEij-rjQ3KEUEeEJZHIuZGxxCr5FDLmKj8ex8XFeHG-hve0LfhstEvnbDu6kNEISHPKwIDYdRxzeFk-Nwa0dAGOQM6PMITs7qRfe7S9QuuO5CxS77WCJxU2S2JgdtMeEGoDLwP-bw4Uf1Vo/s1600/linn_ros.jpg" /></span></a></div>
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<b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial, Helvetica, sans-serif; font-size: 11.0pt; mso-bidi-font-size: 12.0pt;">Linneo (1707 – 1778)</span></b></div>
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<span style="font-size: x-small;"><span style="font-family: Arial,Helvetica,sans-serif;">Naturalista y médico sueco hijo de un pastor
luterano mostró, desde su infancia, una enorme pasión por las plantas. </span></span></div>
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<span style="font-size: x-small;"><span style="font-family: Arial,Helvetica,sans-serif;">Estudió
medicina en la Universidad de Lund, desde donde se trasladó a Upsala. En 1732,
por elección de la Real Sociedad de Ciencias de esta ciudad, es comisionado
para hacer un viaje de estudio a Laponia, desde donde retorna con un numeroso
herbario e importantes observaciones que publica bajo el título de <i>Flora lapponica.</i></span></span></div>
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<span style="font-size: x-small;"><span style="font-family: Arial,Helvetica,sans-serif;">Se desplaza a
Holanda donde estudia y realiza el doctorado en medicina a la edad de 28 años;
publica el <i>Systema Naturae </i>– breve
trabajo en el que adelantaba las líneas maestras de su plan para clasificar los
tres reinos de la naturaleza – y más tarde los <i>Fundamenta Botanica.</i> Tras una breve estancia en Inglaterra regresa
a Suecia en 1737 donde edita <i>Classes
Plantarum</i>. Un año más tarde fue a París donde es elegido miembro de la
Academia de Ciencias y a su vuelta a Suecia es nombrado profesor de medicina,
botánica e historia natural en la Universidad de Upsala. Permanecerá en ella
hasta su jubilación en 1764 después de haber recibido amplio reconocimiento
científico en todo el mundo y ser ennoblecido.</span></span></div>
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<b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial, Helvetica, sans-serif;">¿Cómo se alimentan las plantas?</span></b></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">Resulta significativo
señalar que la cuestión de la fisiología vegetal y animal aparezca, como no
podía ser de otra forma cuando pensamos en ello desde nuestra óptica actual,
relacionado con el estudio de los gases.</span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">La historia de la
emergencia de esta disciplina podemos hacerla arrancar de van Helmont quien no
solo estudió el comportamiento de los <i style="mso-bidi-font-style: normal;">salvajes
e incontrolables espíritus</i> a los que bautizaría con el nombre de <i style="mso-bidi-font-style: normal;">gases</i> que: <i style="mso-bidi-font-style: normal;">no pueden ser retenidos en recipientes ni reducidos a una forma
visible, a menos que la semilla </i>(la fuente de su elasticidad) <i style="mso-bidi-font-style: normal;">sea primero extinguida</i>; sino que también
analizó el proceso de crecimiento de las plantas – el experimento del sauce
plantado en tierra, al que alimentó, al menos en apariencia, solo con agua es
todo un clásico – . De sus observaciones concluiría que la mayor parte de la
sustancia del árbol no es otra cosa que agua trasmutada, de acuerdo con sus
creencias alquímicas, en material térreo, la madera.</span><br />
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<span style="font-family: Arial, Helvetica, sans-serif;"><img height="209" id="il_fi" src="http://www.saburchill.com/facts/images/230907015.jpg" style="padding-bottom: 8px; padding-right: 8px; padding-top: 8px;" width="320" /></span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">El eco de este trabajo
fue grande y de él encontramos rastros en la obra de autores como Robert Boyle
quien en <i style="mso-bidi-font-style: normal;">El químico escéptico</i>
escribe, llevando la experiencia de van Helmont un poco más allá, al eliminar
la tierra en la que hacía crecer las plantas: <i style="mso-bidi-font-style: normal;">(...) el agua puede, por medio de diversos principio seminales,
transmutarse sucesivamente en plantas y animales. Y si consideramos que no solo
los hombres sino también los niños de mama se ven atormentados a menudo por
cálculos y que, incluso, los más diversos tipos de animales se ven molestados
por la aparición de grandes y pesadas piedras en sus hígados y vejigas pese a
que solo se alimentan de hierba y otras plantas que no son, quizás, otra cosa
que agua disfrazada, no resultará improbable que incluso algunas acreciones de
naturaleza mineral puedan formarse a partir de agua.</i> Esta capacidad
trasmutadora del agua en tierra, solo será definitivamente erradicada cuando
Lavoisier aplique su precisa técnica del balance contable a los supuestos casos
de mutación y cuando, más tarde, con el nacimiento y desarrollo de la nueva
química se descomponga y recomponga el agua en sus constituyentes más
elementales.</span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">La dirección en la que se
enfocaba el proceso nutricional de las plantas mediante la trasmutación del
agua en tierra, en la más clara tradición aristotélica, no concedía ningún
papel a la atmósfera. Esta situación cambiaría en la década 1670 – 1680 cuando,
como consecuencia de la utilización del microscopio para observar la estructura
y partes de animales, vegetales, etc., se constatara la existencia de poros
diminutos (estómatas) en las hojas de las plantas, a través de los cuales,
parecía establecerse una comunicación entre el interior de éstas y la
atmósfera. Nehemiah Grew y Marcello Malpighi llegarán a conclusiones similares,
atribuyendo a estos conductos funciones asimilativas y o secretoras. Así se
expresa el primero: <i style="mso-bidi-font-style: normal;">(...) Pero, del mismo
modo que la piel de los animales, sobre todo en ciertas zonas, tiene poros u
orificios abiertos, bien para la recepción o bien para la eliminación de algo,
con la finalidad de beneficiar al organismo, también la piel de al menos muchas
plantas está provista de orificios o conductos para la mejor evaporación de la
savia superflua o para la admisión de aire. </i></span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">Cincuenta años más tarde Stephen
Hales aborda el estudio de las plantas desde la perspectiva de la física y de
la incipiente química. En su <i>Estática
vegetal </i>analiza el proceso de flujo de la savia haciendo uso de la
hidrostática y apunta que los vegetales respiran y que el aire forma parte del
metabolismo de las plantas: <i>Habiendo
encontrado después de muchos experimentos ... que el aire es aspirado en
grandes cantidades por los vegetales, no sólo por sus raíces, sino también a
través de diversas partes de sus troncos y ramas, ello me impulsó a emprender
una investigación más concreta sobre la naturaleza del aire y a descubrir, si
fuera posible, las razones de su gran importancia para la vida y sustento de
las plantas. (...) En las experimentos con viñas, observamos la enorme cantidad
de aire que ascendía en ellas a través de la savia de los tubos; ello muestra
que gran parte de él es absorbido por las plantas y transpirado con la savia a
través de las hojas (...) Por tanto es muy probable que el aire penetre
libremente en las plantas, no solo con la finalidad principal de nutrición a
través de las raíces, sino también a través de la superficie de sus troncos y
hojas, especialmente durante la noche cuando las plantas pasan de un estado de
transpiración a otro de fuerte absorción (...). </i>Con estos antecedentes, no
es extraño que se dedicara al estudio de la extracción de gases de todo tipo de
sustancias, vegetales, animales y también minerales y que sus aportaciones
acabaran siendo de enorme importancia no sólo en el tema que ahora nos ocupa
sino en más amplio de los gases o aires fijos. En el curso de sus
investigaciones desarrollaría un instrumento de importancia crucial: la cuba
neumática o colector de gases que jugará un papel de relevancia extrema en el
control y manejo de los hasta entonces ubicuos aires.</span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUUhqe_JaRIV36tYuD6cPkjPPyr73Q5hV-J-x2iQTFCzFBW41SoA1rcJMddtMnJAaBRtkGVFmZiDuzd7ObOP2FnYV3gOj6Fn3KnHu607W8jcR2JlAhwui7_u6HAXdH2i98H04oeDak00I/s1600/lavoisier-quimico.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></a></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSY38hrmjmlizbepms_HIQj8UQ0FMCkfXPlBJVRwk2Tg0x3um0GukUipmauLR1V5Z1f56Xq3-u3gC0mBNcDEeYCfNvn9WzF4S3whc-yccBh3ml8tZMpvrJSu0LhJfJkKkB5ML1KEOTRNk/s1600/Stephen_Hale_-_pneumatic_trough.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><span style="font-family: Arial, Helvetica, sans-serif;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgSY38hrmjmlizbepms_HIQj8UQ0FMCkfXPlBJVRwk2Tg0x3um0GukUipmauLR1V5Z1f56Xq3-u3gC0mBNcDEeYCfNvn9WzF4S3whc-yccBh3ml8tZMpvrJSu0LhJfJkKkB5ML1KEOTRNk/s320/Stephen_Hale_-_pneumatic_trough.jpg" width="267" /></span></a></div>
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<span style="font-family: Arial, Helvetica, sans-serif; font-size: small;">El
principal personaje de la revolución química, Lavoisier, también intervendrá,
siquiera sea de modo indirecto en esta historia de desentrañamiento del
mecanismo de nutrición de las plantas, cuestionando la, hasta entonces,
admitida trasmutación del agua en elementos terrosos, sea directamente, sea por
intermedio de las plantas. En relación a la primera de estas trasmutaciones
llevará a cabo su famoso experimento de las repetidas destilaciones de agua que,
al parecer, acababan generando un residuo terroso, y en relación a la segunda
sugerirá otros mecanismos explicativos de alta plausibilidad: <i>(...) Hay aquí, entonces, dos fuentes a
partir de las que las plantas crecidas sólo en agua pueden extraer los materiales
terrosos que se encuentran en ellas tras un análisis: primero, a partir de la
propia agua en la que están presentes siempre pequeñas cantidades de tierras
(en solución); segundo, a partir del aire y de las sustancias de todo tipo con
las que está cargado. Los experimentos realizado sobre el crecimiento de
plantas en agua no prueban, en ningún sentido, la posibilidad de trasmutar el
agua en tierra.</i></span></div>
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<span style="font-family: Arial, Helvetica, sans-serif; font-size: small;"><i><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUUhqe_JaRIV36tYuD6cPkjPPyr73Q5hV-J-x2iQTFCzFBW41SoA1rcJMddtMnJAaBRtkGVFmZiDuzd7ObOP2FnYV3gOj6Fn3KnHu607W8jcR2JlAhwui7_u6HAXdH2i98H04oeDak00I/s1600/lavoisier-quimico.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiUUhqe_JaRIV36tYuD6cPkjPPyr73Q5hV-J-x2iQTFCzFBW41SoA1rcJMddtMnJAaBRtkGVFmZiDuzd7ObOP2FnYV3gOj6Fn3KnHu607W8jcR2JlAhwui7_u6HAXdH2i98H04oeDak00I/s1600/lavoisier-quimico.jpg" /></a> </i></span></div>
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<h4>
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<span style="font-family: Arial, Helvetica, sans-serif; font-size: small;">Otro de los protagonistas
de la revolución química, Joseph Priestley, también jugará un importante papel
en nuestra historia. Su aportación tiene que ver con la repetida constatación
de que <i>ciertos procesos</i>, como la
llama de una vela o la respiración animal, tienen la capacidad de viciar el
aire común; Priestley se interroga es estos términos: <i>La cantidad de aire que se requiere para mantener ardiendo incluso una
pequeña llama, es prodigiosa. Se afirma que una vela ordinaria consume
alrededor de un galón por minuto. Tomando en consideración el espectacular
consumo de aire que supone la actividad de fuegos de todo tipo, volcanes,
etc.,parece una importante cuestión
filosófica el indagar que cambios experimenta la constitución del aire
por la acción de la llama así como descubrir que provisión existe en la
naturaleza para remediar el daño que experimenta la atmósfera por estas
acciones. </i>Los experimentos que realiza en esta línea le permitirán
constatar: <i>(...) Estas observaciones me
llevan a concluir que las plantas, en vez de afectar al aire del mismo modo en
que lo hace la respiración animal, invierten los efectos de esta y tienden, por
el contrario, a mantener la atmósfera suave y saludable cuando se ha vuelto
nociva por la acción de la actividad animal o de la putrefacción que acompaña a
su muerte. </i> </span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">Las acciones
contrapuestas de animales y plantas reciben, en el contexto de los
conocimientos de la época, una explicación unificada que las relaciona con otro
asunto crucial, la combustión. La respiración animal, del mismo modo que la
combustión y la putrefacción, parecen añadir algún <i>efluvio venenoso</i> al aire, viciándolo. Las plantas que crecen en
este aire lo reparan eliminando este
efluvio incorporándolo a su estructura como alimento aéreo. La noción de ciclo
vital aparece aquí con nitidez y el mecanismo resulta plausible porque integra
gran número de experiencias y observaciones. Por otra parte, la naturaleza del
efluvio se identifica con el <i>flogisto</i>
y los procesos aquí descritos pasan a formar parte del marco explicativo
general de los procesos químicos que la teoría del flogisto procura.</span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">Viera, como así lo
atestiguan sus referencias a Hales, Priesley, etc., está al tanto de estas
observaciones y experimentos, e incluso mantiene relaciones de cierta amistad
con alguno de los que investigan este tema. Tal es el caso de Jan Ingenhouzs al
que conoció y trató durante su viaje a Austria: <i style="mso-bidi-font-style: normal;">(...) Recibimos la visita del doctor Ingenhousz, médico del emperador,
autor de los nuevos experimentos sobre los aires fijos de las plantas</i>. Más
tarde, el 12 de Diciembre, anotará: <i style="mso-bidi-font-style: normal;">Estuvimos
en casa de Mr. Ingenhousz, quien nos divirtió con sus invenciones eléctricas y
aires de las plantas(...) Con aire desflogisticado extraído de las plantas,
encendió una vela recién apagada, produciendo resplandor y rechinamiento.
Ejecutó otras curiosidades con este mismo aire y el inflamable, y el nitrógeno,
etc.</i>; prosiguiendo el 14 de Enero: <i style="mso-bidi-font-style: normal;">Tuvimos
segunda sesión en casa del célebre Ingenhousz. Diónos parte de sus experiencias
en orden al placer que proporciona el aire desflogisticado cuando se respira.
Trató de un aire inflamable, mucho más activo que la pólvora, etc.</i>; y el 19
de ese mismo mes: <i style="mso-bidi-font-style: normal;">(...) Por la noche
estuvimos con nuestros españoles en casa del doctor Ingenhousz quien repartió
algunos de sus curiosos experimentos</i>. De estas charlas y de estos opúsculos
que recogen sus descubrimientos hará, sin duda alguna, uso al escribir el Canto
V sobre <i style="mso-bidi-font-style: normal;">Los aires vegetales</i> en el
Poema de <i style="mso-bidi-font-style: normal;">los aires fijos</i>.<span lang="ES-TRAD"></span></span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><img height="310" id="il_fi" src="http://upload.wikimedia.org/wikipedia/commons/thumb/c/cf/Jan_Ingenhousz.jpg/220px-Jan_Ingenhousz.jpg" style="padding-bottom: 8px; padding-right: 8px; padding-top: 8px;" width="220" /></span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span>
<b style="mso-bidi-font-weight: normal;"><span lang="ES-TRAD" style="font-family: Arial, Helvetica, sans-serif; font-size: 11.0pt; mso-ansi-language: ES-TRAD; mso-bidi-font-size: 12.0pt;">Jan Ingenhousz
(1730 – 1799)</span></b></div>
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<span style="font-family: Arial,Helvetica,sans-serif;"><span lang="ES-TRAD" style="font-size: x-small;">Nacido en Breda, se trasladó a Inglaterra
donde ejerció como médico durante el periodo 1765 – 1768, época en la que
destacó como precursor del método de variolación, o vacunación contra la
viruela mediante la utilización de los virus obtenidos en pacientes con
contagios leves. En 1768 aplicó este método a la familia de la emperatriz
vienesa María Teresa ejerciendo hasta 1779 – época en la que lo conoció Viera –
como médico de la corte. </span><span lang="EN-US" style="font-size: x-small;">A su regreso a Londres publica sus investigaciones sobre fisiología
vegetal en un artículo titulado <i>Experiments
upon vegetable, discovering their great power of purifying the commom air in
sunshine, and of injuring it in the shade and at night</i>. </span><span lang="ES-TRAD" style="font-size: x-small;">Aparte de estas
actividades, Ingenhousz inventó un aparato para generar cantidades apreciables
de electricidad estática y realizó las primeras medidas cuantitativas de la
conductibilidad térmica de diversos metales. Murió en Inglaterra en 1799.</span></span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;">Los descubrimientos de
Ingenhauzs sobre el papel de la luz en el proceso de asimilación de los gases
por las plantas pueden resumirse en estos términos:</span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">a)<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span>Bajo la influencia de la luz del Sol las
plantas emiten aire desflogisticado (oxígeno) mejorando el aire viciado y
haciendo el aire común u ordinario de mejor calidad. </span></div>
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<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">b)<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span>La acción anterior se lleva a cabo con mayor
vigor e intensidad cuando la iluminación aumenta</span></div>
<div class="MsoNormal" style="margin-left: 18.0pt; mso-list: l2 level1 lfo1; tab-stops: list 18.0pt; text-align: justify; text-indent: -18.0pt;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">c)<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span><span style="mso-spacerun: yes;"> </span>En el
proceso anterior no participa toda la planta sino fundamentalmente las hojas y
los brotes</span></div>
<div class="MsoNormal" style="margin-left: 18.0pt; mso-list: l2 level1 lfo1; tab-stops: list 18.0pt; text-align: justify; text-indent: -18.0pt;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">d)<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span>Las hojas verdes en la oscuridad y las
raíces, flores y frutos en la oscuridad o a la luz vician la atmósfera por la
emisión de un gas tóxico</span></div>
<div class="MsoNormal" style="margin-left: 18.0pt; mso-list: l2 level1 lfo1; tab-stops: list 18.0pt; text-align: justify; text-indent: -18.0pt;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">e)<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span>Sometidas a un ciclo de iluminación normal,
la mejora producida en la atmósfera por las hojas verdes durante el día
sobrepasa el viciado que éstas producen durante la noche así como el que
generan las otras partes de la planta durante todo el ciclo.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;">El conocimiento que Viera
posee sobre el proceso mediante el que se alimentan las plantas no está exento
de contradicciones y así, al mismo tiempo que en el poema de <i style="mso-bidi-font-style: normal;">Los aires fijos</i> presenta en el Canto V,
bajo la inspiración de Ingenhouzs, una acertada descripción del ciclo vital de
aquellas, no duda en conferir al agua, en la estela de las viejas ideas de van
Helmont, un papel casi exclusivo en el proceso nutricio cuando escribe en <i style="mso-bidi-font-style: normal;">El librito de la Doctrina Rural</i>:</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">pregunta:
</span><i style="mso-bidi-font-style: normal;">¿El agua es principio
nutritivo de las plantas?</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">respuesta</span>:
<i style="mso-bidi-font-style: normal;">¿Quien lo puede dudar? No, ninguna planta
puede vivir sin agua</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">p:
<i style="mso-bidi-font-style: normal;">¿</i></span><i style="mso-bidi-font-style: normal;">Y puede vivir con agua sola?</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">r</span>:
<i style="mso-bidi-font-style: normal;">Sí señor: son muchos los experimentos que
lo comprueban, pues un sauce, plantado en un cajón y regado con agua destilada,
llegó a pesar cerca de 200 libras, sin mermas de la tierra. También varias
plantas criadas sobre musgo, o vidrio molido vegetaron muy vigorosas, y dieron
fruto con la sola humedad, que chupaban sus raíces, y que sus hojas atraían de
la atmósfera.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">p:
</span><i style="mso-bidi-font-style: normal;">¿Pues no se ha creído que
las plantas se nutren también de sales de la tierra?</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">r:
</span><i style="mso-bidi-font-style: normal;">¡Ah señor!, en
agricultura no se habla ya de sales, ni de aceites, sino de la descomposición
del agua, mediante la virtud digestiva de los vegetales, como más adelante
veremos.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">p:
</span><i style="mso-bidi-font-style: normal;">Está muy bien que el agua
pura sea principio nutritivo de las plantas; ¿pero no vemos que el agua cargada
de materiales producidos por la putrefacción y fermentación del estiércol, les
es más favorable?</i> </span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="font-variant: small-caps;">r:
</span><i style="mso-bidi-font-style: normal;">No hay duda que es así;
pero es porque la planta, recibiendo de ese modo unos jugos ya laborados, y más
asimilados a ella, tiene menos que trabajar. </i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;">La ruta hasta el
desentrañamiento del proceso de fotosíntesis aparecía delineada por Ingenhouzs;
su recorrido, no obstante, sería largo y dificultoso; pero esto es otra
historia, sin duda apasionante, cuyos <i style="mso-bidi-font-style: normal;">momentos
</i>más significativos son:</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="margin-left: 18.0pt; mso-list: l1 level1 lfo2; tab-stops: list 18.0pt; text-align: justify; text-indent: -18.0pt;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">·<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span>La comprensión del proceso de la combustión,
con la consiguiente identificación de los aires <i style="mso-bidi-font-style: normal;">desflogisticado</i> y <i style="mso-bidi-font-style: normal;">fijo </i>como
oxígeno y dióxido de carbono respectivamente, permitió realizar, en 1804,
experimentos precisos sobre los intercambios gaseosos en los procesos de
nutrición y crecimiento de las plantas pudiéndose determinar entonces que la
ganancia de peso de estas era la suma del carbono procedente del dióxido de
carbono absorbido a partir de la atmósfera y del agua incorporada a través de
las raíces.</span><br />
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="margin-left: 18.0pt; mso-list: l1 level1 lfo2; tab-stops: list 18.0pt; text-align: justify; text-indent: -18.0pt;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">·<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span>Los avances posteriores en termoquímica
permitirían, casi medio siglo más tarde, entender que la energía luminosa
procedente del Sol se almacenaba como energía química en los productos
generados durante la fotosíntesis según una reacción que viene sintetizada en
la ecuación siguiente:</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div align="center" class="MsoNormal" style="text-align: center;">
<span style="font-family: Arial, Helvetica, sans-serif;">CO<sub>2</sub>
+ 2H<sub>2</sub>O --> <span style="mso-char-type: symbol; mso-symbol-font-family: Symbol;"></span> (C H<sub>2</sub>O)
+ O<sub>2</sub> + H<sub>2</sub>O</span></div>
<div align="center" class="MsoNormal" style="text-align: center;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="margin-left: 18.0pt; mso-list: l0 level1 lfo3; tab-stops: list 18.0pt; text-align: justify; text-indent: -18.0pt;">
<span style="font-family: Arial, Helvetica, sans-serif;"><span style="mso-list: Ignore;">·<span style="font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;">
</span></span>Los detalles mediante los que el proceso
general indicado por la ecuación anterior tiene lugar, sus fases <i style="mso-bidi-font-style: normal;">luminosa </i>y <i style="mso-bidi-font-style: normal;">oscura</i>, sólo acabarían comprendiéndose de modo completo ya en el
siglo XX.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: Arial, Helvetica, sans-serif;"><br /></span></div>
<div class="MsoNormal">
<div class="separator" style="clear: both; text-align: center;">
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" 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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-25925936064583511142012-10-22T17:23:00.003+01:002012-10-22T17:29:53.261+01:00REFLEXIONES SOBRE EDUCACIÓN LO SUSTANCIAL Y LO ACCESORIO (I)<!--[if gte mso 9]><xml>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"> Desde hace meses la educación ha pasado
a ocupar cabeceras en los periódicos de nuestro país, ¿significa esto que este
asunto se ha convertido en motivo central de un debate a fondo y en una preocupación
genuina de la sociedad?</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"> La respuesta, desgraciadamente, es
negativa; de hecho las razones por las que aparece “bajo foco” son ahora, como
en la mayor parte de las ocasiones anteriores, episódicas –los exabruptos del
ministro Wert– o circunstanciales (pese a su importancia) –los
recortes. </span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">Las
razones profundas del fracaso de la educación en nuestro país apenas se abordan
y, en cualquier caso, quedan aplastadas por el ruido generado por esas dos
Españas que dirimen a “garrotazos y descalificaciones” o con cambios
continuados de las leyes educativas sus diferencias. Permanece, así, en la
sombra lo sustancial.</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">.................................................</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">Pese a los casi cuarenta años de democracia hay una
serie de contenciosos que no hemos sido capaces de superar y entre ellos se
encuentra el de la articulación de un sistema educativo consensuado: ¿cuales
son las razones de esta incapacidad que parece congénita? ¿con qué escollo
topamos una y otra vez?</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">Una mirada retrospectiva quizás nos ayude a entender
el asunto. </span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">El tránsito de la Dictadura a la democracia fue
producto de un pacto entre los poderes fácticos de la Dictadura y las
emergentes organizaciones de la oposición antifranquista y, como todo pacto,
exigió concesiones mutuas –¡también en educación!</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">Conviene recordar que durante cuarenta años la Iglesia
recibió, por su apoyo decisivo al Alzamiento y posterior Cruzada, un trato de
favor y privilegio considerables y que a ella se le encomendó un papel esencial
en la educación –esta sí, de adoctrinamiento profundo– de las élites del país.
Las distintas órdenes religiosas se convirtieron, así, en patronales del sector
hasta el punto de considerar la educación como esfera de su patrimonio.</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: center; text-indent: 35.4pt;">
<span style="font-size: small;"><img alt="" height="187" src="http://www.laicismo.org/data/imgs/imagen_1780.png" width="320" /> </span><br />
<br />
</div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">El ascenso del partido socialista al poder fue
esencial para iniciar el paso a la modernidad que nuestro país necesitaba y a
esa tarea se dedicó, con éxito en muchos casos y con algún que otro fracaso en
otros –los claroscuros son propios de toda acción humana, mucho más en la
política, y claroscuros encontramos en el asunto que nos ocupa: la educación.</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">La Iglesia, consciente de la pérdida de la hegemonía
de la que había disfrutado durante la Dictadura y sin hacer ningún acto de
contricción por ello, comenzó a jugar sus cartas y pasó a abanderar –¡se
necesita cinismo!– la defensa de la libertad de enseñanza; amparada por los
infames Acuerdos con la Santa Sede y protegida por un sector apreciable de una
población de flaca memoria y de una derecha escasamente laica, consiguió una
cuota apreciable de control educativo a través de los conciertos de los centros
privados y el mantenimiento del estatus privilegiado de la Religión en el
currículo educativo general. </span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">La ideología católica permaneció, así, enquistada en
la estructura del sistema educativo y la laicidad perdió la batalla no sólo en
este ámbito sino, también, en el espacio civil –¿tiene, acaso, sentido esa
omnipresencia de símbolos religiosos en las tomas de posesión de los cargos
políticos, la ocupación reiterada de las zonas públicas por procesiones y demás
rituales católicos o la inevitable participación de curas en las aperturas e
inauguraciones de obras civiles?– y, al igual que en las “guerras de trincheras”,
ocupada una posición, no es sencillo desalojarla.</span></div>
<div class="MsoNormal" style="text-align: center; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: center; text-indent: 35.4pt;">
<span style="font-size: small;"><img alt="" class="rg_hi uh_hi" data-height="251" data-width="201" height="251" id="rg_hi" src="https://encrypted-tbn3.gstatic.com/images?q=tbn:ANd9GcRNOXrC7QRBmxKsFK6dbMzxrSMs0puw-y9GMdW0ftt3hdIYxhSETg" style="height: 251px; width: 201px;" width="201" /> </span></div>
<div class="MsoNormal" style="text-align: center; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">De ahí que todos los intentos por modificar el <i>statu quo</i> sean presentados a la
sociedad, por aquellos que son el ejemplo más palmario de ideologización, como
ideológicos –su defensa de la adoctrinadora asignatura de Religión en la
escuela y su oposición a asignaturas como <i>Educación
para la Ciudadanía</i> o <i>Ciencias para el
Mundo Contemporáneo</i> son claras muestras de esta actitud. </span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;">El claro respaldo del ministro Wert a la Iglesia en
estos temas resulta inquietante y parece augurar no sólo un debilitamiento de
la laicidad en la escuela sino una ofensiva religiosa, ¡claramente ideológica!,
para recuperar o ampliar zonas de influencia.</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<br /></div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-58373482439104675112012-10-04T16:39:00.002+01:002012-10-04T16:42:48.602+01:00¿EDUCAR DE OTRO MODO?: LA RED COMO MEMORIA COMPLEMENTARIA<br />
<br />
Hace unos días discutía con varios amigos, no recuerdo sobre qué asunto, cuando, en un determinado momento, uno de ellos tiró de Iphone y previa consulta en la Red aportó los datos que neecesitábamos para proseguir el debate; alertado por ello pude comprobar que en más de una tertulia civilizada alguno de los participantes hacía uso de similar artefacto.<br />
<br />
Me pareció que, cada vez más, la utilización de esta memoria adicional va a formar parte, si no lo hace ya, de la vida cotidiana y del quehacer de muchísimos ciudadanos.<br />
<br />
Pienso que la escuela tendría que adiestrar a los alumnos en el manejo de esta ingente cantidad de información y que las disciplinas que en aquella se imparten deben hacer uso de esa memoria extendida -pues de eso se trata.
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-87639791558989781682012-10-02T16:47:00.000+01:002012-10-02T17:01:57.318+01:00D. BOSCO EN LA OROTAVA: OLVIDAR LA HISTORIA ES CONDENARSE A REPETIRLA<!--[if gte mso 9]><xml>
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<br />
<div class="MsoNormal">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"> </span><span style="font-size: small;">La Familia Salesiana orotavense se apresta a recibir
gozosa los restos del Santo Fundador de la Orden.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"> En lo que probablemente será una
nutrida multitud de loas y recuerdos dulcificados –la nostalgia tiene escasa y
selectiva memoria– quisiera incluir aquí, a modo de contrapunto y acudiendo a
las fuentes, una edificante historia.</span></div>
<div class="MsoNormal" style="margin-left: 10.8pt; margin-right: 4.65pt; text-align: justify; text-indent: 25.2pt;">
<br />
<span style="font-size: small;">El que sigue, el <i>Sueño de las 22
lunas</i>, es uno de los varios relatos en los que D. Bosco anunciaba muertes y
así se cuenta en el libro que recoge los hechos del Santo:</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<br />
<span style="font-size: small;">“<i>Me
encontraba en medio de vosotros en el patio y me alegraba en mi corazón al
veros tan vivarachos, alegres y contentos. Quiénes saltaban, quiénes gritaban,
otros corrían. De pronto veo que uno de vosotros salió por una puerta de la
casa y comenzó a pasear entre los compañeros con una especie de chistera o
turbante en la cabeza. Era el tal turbante transparente, estando iluminado por
dentro,ostentando en el centro una hermosa luna en la que aparecía grabada la
cifra 22. Yo, admirado, procuré inmediatamente acercarme al joven en cuestión
para decirle que dejase aquel disfraz carnavalesco; pero he aquí que, entre
tanto, el ambiente comenzó a oscurecerse y como a toque de campana el patio
quedó desierto, yendo todos los jóvenes a reunirse en fila debajo de los pórticos.
Todos reflejaban en sus rostros un gran temor y diez o doce tenían la cara
cubierta de mortal palidez. Yo pasé por delante de todos para examinarlos y
entre los tales descubrí al que llevaba la luna sobre la cabeza, el cual estaba
más pálido que los demás; de sus hombros pendía un manto fúnebre.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><i>Me
dirijo a él para preguntarle el significado de todo aquello, cuando una mano me
detiene y veo a un desconocido de aspecto grave y noble continente, que me
dice: Antes de acercarte a él, escúchame; todavía tiene 22 lunas de tiempo;
antes de que hayan pasado, este joven morirá. No le pierdas de vista y
prepáralo.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><i>Yo
quise pedir a aquel personaje alguna otra explicación sobre lo que me acababa
de decir y sobre su repentina aparición, pero no logré verle más.</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><i>El joven
en cuestión, mis queridos hijos, me es conocido y está en medio de vosotros</i></span><span style="font-size: small;">.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">Los comentaristas anotan… <i>Un vivo terror se apoderó de los oyentes,
tanto más siendo la primera vez que San Juan Bosco anunciaba en público y con
cierta solemnidad la muerte de uno de los de casa.</i> </span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">El buen padre no pudo por menos de notarlo
y prosiguió: <i>Yo conozco al de las lunas,
está en medio de vosotros. Pero no quiero que os asustéis. Como os he dicho, se
trata de un sueño y sabéis que no siempre se debe prestar fe a los sueños. De
todas maneras, sea como fuere, lo cierto es que debemos estar siempre
preparados como nos lo recomienda el Divino Salvador en el Evangelio y no
cometer pecados; entonces la muerte no nos causará espanto. Sed todos buenos,
no ofendan al Señor y yo entre tanto estaré alerta y no perderé de vista al del
número 22, el de las 22 lunas o 22 meses, que eso quiere decir, y espero que
tendrá una buena muerte.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">Esta noticia, si bien asustó mucho al
principio a los jóvenes, hizo inmediatamente un grandísimo bien entre ellos,
pues todos procuraban mantenerse en gracia de Dios, con el pensamiento de la
muerte, mientras contaban las lunas que se iban sucediendo.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">San Juan Bosco, de vez en cuando, les
preguntaba: <i>¿Cuántas lunas faltan aún?</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">Y los jóvenes respondían: <i>Veinte, dieciocho, quince, etc.</i></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">A veces, algunos que no perdían una sola
de sus palabras, se le acercaban para decirle el número de lunas que habían
pasado e intentaban hacer pronósticos, adivinar... pero Don Bosco guardaba
silencio”.</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">En este tono prosigue el relato…</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">La insensibilidad de la que hace gala el
relator ante la crueldad con la que el Santo juega con el terror de sus alumnos
permite entender la turbia atmósfera de sadomasoquismo que permeó nuestra vida
colegial durante los negros años del Franquismo.</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;">Esto es también parte de nuestra historia ¿o
no?</span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 34pt;">
<br /></div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-8412952987089424652012-09-05T18:51:00.003+01:002012-09-05T18:54:40.821+01:00MALTRATO BANCARIO: TRIBULACIONES DE UN USUARIO DE LA CAJA<br />
<br />
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<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Uno siempre había creído –al menos eso era lo que decían
quienes sabían de economía, finanzas y negocios– que cuando una empresa
necesitaba liquidez, dinero en suma, se esforzaba por atraer a los clientes
ofreciéndoles incentivos, buen servicio y ventajas de todo tipo; jamás, salvo
que quienes regentaran la entidad fueran suicidas o pretendieran acabar con
ella, era de recibo actuar de otro modo y, en ningún caso, era imaginable tener
como código de conducta el desprecio y maltrato del usuario.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Pues bien, en estos tiempos de mudanza
y de destrucción de ancestrales certezas, esta creencia carece, al parecer, de
sentido; para cerciorarse de ello basta con acudir a la Caja de Ahorros de La
Orotava a realizar cualquier gestión: colas interminables, restricciones
horarias para realizar según qué operaciones, escasez de personal, etc., etc.,
etc.; en suma, desatención y maltrato al cliente. </span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Puestos a tomar el pelo a quienes
depositan el dinero en esa entidad, o quizás por eso –ya se sabe que pervertir
el lenguaje y el significado de las palabras es ahora moneda corriente– ha pasada
a formar parte de un grupo mayor que –¡sí!, ¡sí!, no es broma– se denomina
Banca Cívica (¡¡¡). </span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El sector bancario, responsable en gran medida de este
desaguisado que padecemos todos y estimulado tanto por las escasas
responsabilidades que se le han exigido como por la inyección de dinero –el nuestro–
con que le surte el Gobierno, no sólo no modifica sus malas prácticas sino que,
por el contrario, las acentúa: ¿por qué preocuparse por el servicio que damos
si, en cualquier caso, nuestro rescate está garantizado?</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Hay
que devolver el verdadero sentido a las palabras y empezar poner en valor
nuestra condición de ciudadanos.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-50013194561794401572012-09-04T19:00:00.001+01:002012-09-04T19:00:42.720+01:00CHO - ¿O SERÁ CHA?- FERIANTE DE HONOR: CULTURA Y DEPENDENCIA<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
La reciente designación de la exconsejera de Educación y actual Vicepresidenta de la ZEC, Dña. Milagros Luis Brito, como "Cho Feriante de Honor" en la Feria de Pinolere, me ha hecho reflexionar sobre las servidumbres que conlleva depender, para subsistir, del arbitrismo de aquellos que ocupan puestos desde los que se decide la concesión o no de subvenciones dinerarias a las instituciones culturales. </div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Estoy convencido de que las razones de esta designación poco tienen que ver con sus méritos como artesana y mucho con la buena disposición que habrá mostrado para el mantenimiento de la Fundación, también lo estoy de que tanto los responsables de la Feria como la premiada lo saben -aquellos ocultan las verdaderas razones y ésta se "hace la loca" y agradece la distinción (¡una más para su currículo!). En todo caso resulta penoso que sea el estado de ánimo del político de turno el
factor determinante de la pervivencia o desaparición de una actividad,
prestigiosa o no, y que los animadores de proyectos como el que nos ocupa se vean obligados a ejercer como actores y en cierta medida -dicho esto sin ánimo de ofensa- como "estómagos agradecidos"; pero así funciona el asunto.</div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Una sociedad civil desvertebrada, en la que la cultura aparece mediatizada por su dependencia del poder, está a merced de estos politiquillos de profesión que lo mismo valen para gestionar medio ambiente, educación, cultura, economía o lo que le echen. </div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
Para ellos ¡Lo importante es estar en la feria!, con título honorífico o no.</div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
</div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<br /></div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-33106101107011130192012-08-27T16:47:00.000+01:002012-08-27T17:02:17.423+01:00RECUERDOS DE UN LECTOR (A VECES) COMPULSIVO ( y III)<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
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Aunque ya había cursado dos años en la Universidad de La Laguna mi inmersión en la agitada vida estudiantil del antifranquismo comenzó de hecho en las aulas de la Complutense. De esta historia hablaré en otro lugar pero sí quiero consignar aquí, en lo que a lecturas se refiere, que mi estancia en la casa de Micaela Pi, mi patrona en la Villa y Corte, me permitió devorar todas las obras de Tarzán que, recuerdo, guardaban en un armario y que, también durante ese primer año, descubrí las librerías de viejo de la Calle S. Bernardo, la mítica Cuesta de Moyano –a la que peregrinaría con asiduidad desde entonces– y un puesto callejero, a la salida del metro de Argüelles, donde se ofertaban, en abigarrada muestra, ediciones resumidas de <i>El Capital</i> o <i>El origen del hombre</i> junto a ejemplares de <i>Mi lucha</i>.<br />
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Es esta, también, la época del boom de la literatura sudamericana, del descubrimiento y la compulsiva lectura de Cortázar, Vargas Llosa, Rulfo, Carlos Fuentes, García Márquez y tantos otros. Devoré entonces, con pasión al tiempo que con cierto sentimiento de culpa por las horas que robaba al más descarnado y frío atractivo de las asignaturas científicas, <i>Rayuela, La casa verde, La muerte de Artemio Cruz, Cien años de soledad, Pedro Páramo</i> y muchas otras historias –novelas o cuentos. Deslumbraba la potencia narrativa que desplegaban y como muchos otros, imagino, soñé con ser escritor o, al menos, con escribir un relato –de esos tiempos es un cuaderno en el que hacía mis “pinitos literarios” y que, desgraciadamente, extravié.<br />
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El interés por los proscritos por el Régimen, la relación cada vez mayor con compañeros comprometidos en la contestación antifranquista, las luchas estudiantiles y las continuadas visitas a las citadas librerías de S. Bernardo, entre ellas la mítica <i>Fuentetaja</i>, me puso en contacto con los circuitos clandestinos. La literatura de trastienda hizo, así, irrupción en mi vida y, con el creciente compromiso político, se inició el consumo febril, hasta el empacho, de ensayos de economía, política, sociología y filosofía de sustrato marxista.<br />
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A los padres fundadores –Marx y Engels (¡leer el <i>Manifiesto Comunista </i>y <i>El origen de la familia, la propiedad privada y el Estado </i>fue, entonces, revelador!)– le seguiría toda la cohorte de sus más excelsos e ilustres discípulos –Lenin, Trotsky, Rosa Luxemburgo, Stalin, Mao, Fidel, el Che, etc.– y a estos, o a la par, sus epígonos y comentaristas –Althusser, Poulantzas, Marta Harnecker, Ernest Mandel, Isaac Deutscher y tantos otros. Alrededor de este núcleo, otros “descubrimientos” –impulsados por el “aire” de los tiempos– ampliaban mi perspectiva vital: Herbert Marcuse, Wilhelm Reich y otros ligaban la liberación social y política con la liberación sexual. ¡No es extraño que, en un país como el nuestro reprimido por militares y curas, calara su mensaje y que sus libros –<i>El hombre unidimensional, Eros y civilización, La revolución sexual, La irrupción de la moral sexual</i> o <i>La función del orgasmo</i>– fueran devorados compulsivamente! La puesta en práctica de lo en ellos predicado no dependía, para nuestra desgracia, sólo de la voluntad del lector –en cualquier caso, ¡se hizo lo que se pudo!<br />
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Todas estas obras, de las que un considerable número de ellas eran textos de economía política –<i>El capital monopolista, El intercambio desigual</i>, etc., etc., etc.– acabarían ocupando, junto a un amplio alijo de libros franceses traídos clandestinamente en uno de esos obligados viajes, tan frecuentes entonces, al país vecino en busca de “aires” más respirables, un enorme espacio en mi biblioteca particular y se convertirían en mis libros de cabecera durante un extenso periodo de mi vida en el que la literatura en sentido estricto pasó a un segundo plano: ¡no había tiempo para ocuparse de otra cosa que no fueran estos libros de formación o las revistas de actualidad como <i>Triunfo, Cambio, Cuadernos, Por favor, Hermano Lobo </i>o <i>Tiempo de Historia</i>! El compromiso político y los acontecimientos que se avecinaban nos lo exigían.<br />
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(A mi vuelta de Madrid, atemperada ya la fiebre militante, ocuparían, durante años, los anaqueles del cuarto en el que mi padre escuchaba la radio y leía detenidamente, al tiempo que lo desordenaba, el periódico; imagino que de tanto contemplarlos se preguntaría lo que, en su avanzada vejez, me repetía una y otra vez: <i>Pero, ¿tú te has leído todo eso?; </i>finalmente, la mayor parte de ellos, pasaron a engrosar los fondos de la Biblioteca municipal donde dormirán, con toda seguridad, el “sueño de los justos”).<br />
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Los diques que contenían una enorme energía represada se agrietaban y por esas grietas se colaba una sociedad que poco a poco iba conquistando zonas de libertad. Se avecinaba un tiempo nuevo, se teorizaba el eurocomunismo y consumíamos sesudos estudios sobre el socialismo de rostro humano que, encarnado en figuras como Berlinguer o Dubcek, se construiría a hombros de “la alianza de las fuerzas del trabajo y la cultura” –el libro de Radovan Richta <i>La civilización en la encrucijada </i>fue, en esos años, de lectura obligada.<br />
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El hilo que, durante esta época de activa militancia a la que me he referido en otro lugar, me mantuvo en contacto con la literatura fue el de la “novela negra”, profusamente editada durante esos años, los 70, por Bruguera, Alianza-Emecé y Barral; a ese género pertenece una de mis ficciones favoritas –<i>El largo adiós</i>– a la que asocio con el valor de la amistad.<br />
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Raymond Chandler, Dasshiel Hammet, Chester Himes, Horace McCoy, Ross MacDonald, Jim Thomson y tantos otros pasaron así a formar parte de mis autores de cabecera y a ellos y a otros fabuladores –descubiertos con posterioridad– como Simenon, Philip Kerr, Henning Mankell o Fred Vargas, sigo, aunque con una más atemperada asiduidad, fiel<br />
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A la euforia desatada por la llegada de la Democracia siguió la melancolía que acompañó a los tiempos del Desencanto y, con estos últimos, volví, primero, y, ya, espero que para siempre, a la literatura y, más adelante, también a la Ciencia, a su historia y desarrollo.
Los profetas que anunciaban cambios radicales fallaron estrepitosamente en sus predicciones y la esperanza del advenimiento de una “humanidad nueva” resultó no ser otra cosa que un espejismo.<br />
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El desencanto me hizo regresar plenamente a la ficción –con la que mantenía por entonces el delgado hilo de la novela negra– y en las páginas de <i>Los Demonios, Bajo el volcán, Los hijos de la medianoche, El tambor de hojalata </i>y <i>El cuarteto de Alejandría</i>, volví a reencontrarme con lo real, con los hombres y mujeres de nuestro mundo –me despojé, así, de los últimos vestigios de lo que había resultado ser otro disfraz de “lo religioso”.<br />
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El regreso a la ciencia y a su historia fue paulatino; tuvo su primera materialización en el libro que con el título <i>Detrás del espejo (Física en problemas) </i>publiqué en torno a 1989 –en él trataba de presentar, creo que con cierto éxito, los problemas desde una óptica novedosa y, entre otros recursos, “echaba mano” del contexto histórico y científico en el que se encuadraban– y adquirió envergadura dentro del Seminario Orotava de Historia de la Ciencia que pusimos unos años más tarde, en 1991, y al que me referiré <i>in extenso</i> en otro lugar.
En todo caso, al igual que había sucedido en otras ocasiones los anaqueles de mi biblioteca se llenaron de títulos sobre la materia –de los “grandes” de la Ciencia y de los comentaristas– y a su lectura y estudio dediqué muchas horas.
Además de toda una serie de ponencias sobre diversos temas escribí, con José Luis Prieto, una <i>Historia de la Ciencia</i> en dos volúmenes que, al tiempo que sirviera de soporte a una asignatura de Bachillerato con esa denominación, acercara al gran público los contenidos científicos contextualizados en su tiempo –también de este asunto hablaré con más detalle en otro lugar.<br />
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Al hilo de este recorrido, sin pretensiones de exhaustividad, por el mundo de mis lecturas incluí algunas consideraciones sobre mis héroes de infancia; me preguntaba allí por las razones de mi elección y no acertaba a encontrarlas; tampoco, ahora, las encuentro aunque, al hacer recuento de las historias, de los libros y en última instancia de los personajes –héroes o no– que me interesaron, sí percibo en ellos ciertos rasgos –idealismo solidario y acentuado individualismo– que, a pesar de una metamorfosis que mutó al clásico protagonista de aventuras, a veces de una pieza, en un hombre de este tiempo, complejo y a menudo atormentado, ambos comparten. Quizás fuera esto lo que percibía en ellos.
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-39668842083393887732012-08-24T18:18:00.001+01:002012-08-27T15:17:34.738+01:00RECUERDOS DE UN LECTOR (A VECES) COMPULSIVO II<div class="separator" style="clear: both; text-align: center;">
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Durante nuestra estancia en el colegio salesiano los libros de lectura nunca formaron parte de nuestra educación. Recuerdo, eso sí, que conocíamos el argumento de muchos de los clásicos –<i>El Caballero de Olmedo, El condenado por desconfiado, Don Juan, La vida es sueño, Fuenteovejuna, etc</i>.– y la depurada y blanqueada peripecia vital de sus autores, pero nuestra aproximación al texto original no existió; sólo en contadas ocasiones leímos, por propia iniciativa, alguna de las, creo que resumidas y expurgadas, obras que aparecían en la colección <i>Clásicos Ebro</i>. En cualquier caso tampoco eran estos los libros más adecuados para incitar a la lectura en edades tan tempranas.<br />
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Los “buenos padres” no parecían ser, ¡de hecho no lo eran!, muy aficionados a la lectura –territorio, a su juicio, plagado de minas y altamente peligroso como bien advertían el santo fundador y las autoridades de entonces. Resulta triste, en cualquier caso, que estos iletrados se arrogasen la facultad de recomendarnos –en pocas ocasiones– o prohibirnos –con mayor frecuencia– un título u otro.<br />
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La Iglesia por medio del <i>Índice de libros prohibidos</i> trataba de controlar, al igual que lo hacía en el cine con las famosas calificaciones morales de las películas –1, 2, 3, 3-R y 4– que se exhibían en la entrada de los templos, todas las facetas de nuestra vida. A la censura impuesta por un Estado totalitario se añadía la tutela de una Iglesia igual de totalitaria: por si no era suficiente una, ¡doble ración!<br />
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Mis primeros títulos “serios”, alguno de los cuáles iba a tener una profunda influencia en mi crisis de conciencia, están ligados a dos editoriales esenciales en la recuperación de la gran literatura en nuestro país –Plaza y Janés y Espasa Calpe– y a dos de sus colecciones, Reno y Austral respectivamente. A través de ellas, generalmente en traducciones que dejaban bastante que desear, conocí de la existencia y de los escritos de tres autores que me impactaron y removieron mis convicciones: <i>Giovanni Papini, Miguel de Unamuno y Fiodor Dostoyevski</i>.<br />
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<i>Gog, El libro negro, Palabras y sangre, El Juicio Universal</i> y <i>El Diablo </i>alteraron mi visión religiosa, ya conturbada por las dudas que por entonces me asaltaban y que encontraron eco y reflejo en la forma agónica de entender la relación con Dios que predicaba el disconforme intelectual vasco en sus ensayos y novelas (o “nivolas” como le gustaba calificarlas), <i>El sentimiento trágico de la vida, La agonía del cristianismo</i> o <i>S. Manuel Bueno, mártir</i>.<br />
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Hallaba en ellos un fondo de rebeldía que se ajustaba a lo que, por aquellos tiempos, comenzaba a sentir y me identificaba con el destino a todas luces injusto que habían merecido muchos de los personajes que las Iglesias o el mismo Dios condenaban –sus nombres, hechos y razones se recogían en <i>El Juicio Universal</i>; recuerdo que me impresionó un relato que aparecía en <i>El libro negro</i> en el que un resucitado o más bien un “llamado a la vida” desde el más allá describía, como sigue, el alzamiento de los condenados contra el Supremo Hacedor.<br />
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<i>“Tan sólo le hablaré acerca del acontecimiento más notable al que asistí durante los largos años de mi estadía entre los muertos.
Según me parece, los hombres creen que el mundo del más allá no tiene historia: todo es determinado y fijado por la omnipotencia del Eterno, cada difunto tiene su nicho y su sentencia, nada puede hacer cambiar su suerte, los condenados rechinan en las tinieblas, los bienaventurados exultan en la luz, diablos y ángeles tienen a perpetuidad sus misiones y nada cambia por los siglos de los siglos. Pues bien, puedo asegurarle que, muy al contrario, incluso en el más allá hay una historia, o sea: el más allá tiene sus crisis y sus alternativas. </i><br />
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<i>Hacía ya mucho tiempo que yacía en las tinieblas exteriores, bajo el peso de mis culpas, cuando repentinamente se difundió en el inmenso reino de los muertos una noticia inaudita: un grupo de veteranos del infierno había dado la primera señal de la sublevación general de los condenados [...]
Uno de los jefes de la revuelta, el famoso Münzer, andaba de un lado para otro por las interminables tinieblas, incitando a los pusilánimes y los dudosos. Les hablaba así “Somos víctimas de una despiadada injusticia que se halla en abierta contradicción con el mensaje de perdón anunciado por el Hijo de Dios. La eternidad de las penas no es conciliable con el Dios todo amor proclamado por los santos y los teólogos[...] El hombre es un ser limitado, finito, que comete un error limitado en el espacio y en el tiempo, y a veces lo comete arrastrado por la fatalidad de su naturaleza, de lo cual no es siempre responsable. ¿Por qué, a la finitud del ser culpable y de su culpa, debe corresponder la infinitud del castigo [...]
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<i>Se dice que si bien el pecador es finito, su pecado es infinito porque es una ofensa contra el Ser Infinito. Pero Dios, que es perfección absoluta y amor perenne, ¿puede ser ofendido por una pobre criatura, que en definitiva es obra suya?
Reconocemos a la justicia divina el derecho de castigar a los malvados. Pero no podemos admitir y tolerar que un pecado, finito por naturaleza, deba ser castigado con una pena sin fin.</i><br />
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<i> [...] Vosotros sabéis qué es la eternidad, cuán atroz es el pensamiento de un dolor que jamás tendrá término, de las tinieblas que nunca tendrán un resquicio de amanecer. Después de siglos en la cárcel y la oscuridad tan sólo pedimos una liberación final, un retorno a la luz. Apelamos a la misericordia de Dios contra su cruel justicia.
[...] Pero el cielo permanecía mudo, ninguna voz descendía desde lo alto, no apareció ningún ángel para anunciar la confirmación de la sentencia o la promesa del indulto. Sin embargo, la revuelta no se aplacaba y los desesperados gritos de los malditos continuaban golpeando las invisibles paredes del abismo.
Pero, no sé cómo, un día llegó al infierno una noticia increíble: hasta los bienaventurados del paraíso amenazaban abrazar la causa de sus hermanos condenados. [...] Los justos pedían a Dios compasión para con los injustos. [...] Su propia felicidad no era perfecta porque se veía perturbada por el pensamiento de los tormentos infinitos que sufrían seres a los que habían amado en la tierra. Se dirigían a Dios: “Nos prometiste la felicidad eterna, pero esta felicidad no puede ser plena y total mientras nos veamos entristecidos por la compasión que nos inspiran los seres a los que destinaste al dolor eterno. La tortura de los condenados es una disminución de nuestro gozo, y, consiguientemente, también nosotros somos castigados indirectamente por culpas que no hemos cometido, y esto no se conforma con tu justicia y tu misericordia.
Ordenaste a los hombres que perdonaran a sus enemigos, ¿por qué no das el más sublime ejemplo perdonando a los enemigos de tu Ley, después de tantas vigilias de horror?”
Pero Dios escuchaba y callaba. Entonces muchos bienaventurados, y entre los primeros los santos más venerados, se ofrecieron para descender al infierno y ocupar el lugar de los infelices desterrados [...].
En el Empíreo habían cesado los cantos, ahora resonaban los gemidos y las súplicas; los ángeles, asombrados y conmovidos, guardaban silencio contemplando el rostro del Eterno.
Pero Dios escuchaba y callaba...” </i><br />
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<i>Llegado a esas palabras de su relato, míster Newborn interrumpió de golpe aquel inaudito acontecimiento.
-¿Y después? - preguntó míster Gifford pasados algunos instantes.
- Después, no supe más nada ni nada puedo decir - replicó el resucitado con voz débil.
“Precisamente mientras todos los muertos, los que alababan y los que gritaban, esperaban la decisión de Dios, fui llamado otra vez a la vida terrestre por mis hermanos vivientes. Tal vez, cuando llaméis a un nuevo resucitado, éste podrá relataros la continuación de mi historia”.</i>
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El relato era, como mínimo, inquietante.<br />
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La crítica de unas verdades que se nos habían inculcado sin discusión alguna y la puesta de manifiesto de elementos de contradicción en la doctrina que nos ahormaba, resultaba no sólo turbadora sino, también, excitante; había espacio para la reflexión y para el debate y era factible introducir diferencias, de matiz o radicales; atisbabas las potencialidades del ejercicio de la libertad.<br />
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Muy vívido es, por otra parte, el recuerdo que tengo de las páginas de esa cima de la literatura que responde al título de <i>Los hermanos Karamazov</i> y que leí por primera vez en una infame versión mutilada de la Editoria Sopena –desde entonces uno de mis libros favoritos y al que, ya en versión íntegra, vuelvo con frecuencia– en las que sobrevuela la idea que se expresa de forma concisa y profunda en la máxima <i>Si Dios no existe, todo está permitido</i> y que abre un extenso territorio para el debate moral.<br />
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Abandonar certezas exigía, entonces, emprender nuevas búsquedas en las que anclar lo que hacíamos y lo que planeábamos hacer.
Durante esta época, los años previos a mi ingreso en la Universidad y los primeros de mi estancia en ella, adquirí la costumbre de compartir no sólo lecturas sino también las anotaciones de un diario con un íntimo amigo de adolescencia, Jaime Hernández. Recuerdo que elaborábamos unas fichas en las que, aparte de dar cuenta del título, autor, año de publicación y otras referencias técnicas, hacíamos un comentario personal que nos obligaba a reflexionar sobre el libro y a articular un discurso crítico: la lectura y lo que leíamos formaba parte del desarrollo de nuestras personalidades. También con Francis Miranda y Domingo Eulogio compartí lecturas y libros que comprábamos en comandita para sacar mayor rendimiento a nuestros ahorros y ampliar nuestras adquisiciones.<br />
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El peso de la religión me exigió un necesario y dilatado ajuste de cuentas; en el proceso, primero un periodo de militancia cristiana en los movimientos de raíz francesa que aquí se encarnaron en la JOC, la JIC y la JEC –siglas que hacía referencia a las juventudes, obrera, independiente y estudiantil, católicas– y más tarde la incorporación a la contestación antifranquista en la órbita del PCE.
Y franceses fueron algunos de los autores clave que recorrieron conmigo ese camino que va desde la liberación religiosa a la militancia comunista.<br />
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Primero, Maxence van der Meersch –en la onda del catolicismo social– y más tarde Jean Paul Sartre –ya en clave atea– y, en menor medida, Albert Camus. Del primero tengo el recuerdo, ahora impreciso, de varias de sus novelas,<i> La huella del dios </i>por la potente personalidad de su protagonista –que yo imaginaba con los rasgos de mi actor favorito entonces, Gary Cooper–, <i>Cuerpos y almas </i>por el realismo descarnado de sus descripciones y <i>Una esclavitud de nuestro tiempo</i> y <i>La máscara de la carne </i>por los problemas, la prostitución y la homosexualidad, que abordaba; del segundo, en cambio, me deslumbró su radical apuesta por la libertad: el hombre está condenado –decía– a ser libre y ya no nos es posible acudir ni a una presunta naturaleza humana ni, mucho menos, a Dios para fundamentar la ética. Buscar, pues, justificación para nuestras acciones en estas instancias era actuar con mala fe –mi convicción de que cada uno es responsable de sus actos procede, ¡estoy seguro de ello!, de la profunda huella que dejaron en mí obras como <i>La náusea, Los caminos de la libertad, A puerta cerrada</i> o <i>Las moscas</i>; del tercero, de Camus, me impresionaron sus desasosegantes narraciones <i>El extranjero </i>y <i>La peste </i>–mi deriva hacia el marxismo me hizo, no obstante, sartreano en vez de camusiano: la toma de partido en un mundo bipolar me impidió, como a tantos otros, valorar en su justa medida la crítica, a lo que en última instancia compartía rasgos con la religión, que tan acertadamente desarrolló el escritor argelino.<br />
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A Plaza y Janés –donde además de alguno de los autores mencionados leí con avidez a escritores tan variopintos y heterogéneos como Somerset Maughan, Sinclair Lewis, Hemingway, Faulkner, Dos Passos, Lajos Zilahy, Aynd Rand, Knut Hamsun, Pearl S. Buck, Chesterton, Andre Maurois, François Mauriac, Graham Green, John Steinbeck y muchos otros– le siguió el amplio muestrario que ofrecía Losada, editorial en la que era posible escuchar nuevas voces a las que aureolaba su condena por la censura franquista. Ahí me encontré con el Bernanos de <i><i>Los grandes cementerios</i> bajo la luna</i>, con la <i>Residencia en tierra</i> y el <i>Canto general </i>de Neruda, así como con la poesía de los grandes de la generación de la República –Miguel Hernández, Vallejo, León Felipe, Antonio Machado, Alberti, etc.– ; me dí de bruces, en suma, con la Guerra Civil, con la obra de los vencidos.
Este periodo de mi peripecia como lector se superpuso al que se inició con mi ida a Madrid a estudiar Físicas.<br />
<br />miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-83414024060762860712012-08-24T17:51:00.000+01:002012-08-27T15:29:12.514+01:00RECUERDOS DE UN LECTOR (A VECES) COMPULSIVO I<br />
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No sé las razones, pero siempre fui un lector voraz. Sí recuerdo, sin embargo, que mi madre y mis tías hacían mención a sus hermanos Antonio y Pepe, entonces “embarcados” a Sudamérica, como personas infectadas por el mismo virus. De ellos decían que se pasaban las horas muertas leyendo, ¡como yo!... Sería cosa de familia…</div>
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Las primeras lecturas de las que tengo memoria nítida son los tebeos –<i>Chispita, El Cachorro, Juan Centella, Bill Cody, El diablo de los mares, El Charro Temerario, Mascarita</i> y tantos otros–, las novelas baratas –con personajes fijos como Bill Barnes, Doc Savage o Pete Rice o las de serie escritas por Marcial Lafuente Estefanía, Keith Luger o Silver Kane–, los relatos de la <i>Colección Historias </i>(con 250 ilustraciones) –por los que establecíamos nuestro primer contacto con autores clásicos de la aventura como Salgari, Verne, Stevenson o Walter Scott– y los rojos libros de Molino que narraban las peripecias de Guillermo Brown y los Proscritos. Estas dos últimas colecciones, Historias y Guillermo, formaban parte esencial, junto a las coloreadas latas de caramelos que se adquirían en La Venta Nueva, Anita o Casa Juan José, de los regalos que habitualmente recibíamos en la celebración de nuestras, inevitablemente chocolateadas, fiestas de cumpleaños.<br />
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En tiempos de penuria y sometidos al férreo control de nuestros ensotanados educadores esos personajes nos permitían soñar con otros espacios y vivir, enfundados en su piel, otras vidas ¿No es este el mayor regalo que puede dar la lectura? </div>
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Durante un largo periodo de mi adolescencia seguí siendo fiel a los tebeos aunque los personajes favoritos cambiaran. En 1958 irrumpió en el mundo del tebeo español la colección Héroes Modernos editada por la Editorial Dólar y con ella entró en mi vida <i>El Hombre Enmascarado, The Phantom</i> en su versión original, protagonizando la primera de una serie de aventuras que me cautivaron: <i>La princesa Sansamor.</i> Las viñetas de esa primera entrega, dibujadas por Wilson McCoy, mostraban a un personaje con sombrero y gafas negras que, en una noche de niebla y enfundado en un abrigo a cuadros pasea, sujetando con una correa, a lo que parece un perro lobo; un globo recoge sus palabras: <i>¡Me gustan los muelles de noche! ¿Notas un silencio extraño, Satán?.</i> Un malhechor lo aborda, mientras otro, oculto tras unos fardos, trata de golpearlo… <i>Satán</i>, otras veces <i>Diablo</i>, lanza un ladrido y… la misteriosa trama comienza<br />
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El reverso de la portada nos daba más datos de este personaje que había creado en 1936 Lee Falk y que inicialmente ilustraba Ray Moore. Así supimos que nuestro héroe era uno más de la saga de los Fantasmas que habían iniciado su combate contra el Mal desde los lejanos tiempos de 1525 cuando un noble inglés Sir Christopher Standish vió, antes de naufragar y ser arrojado a una playa de incierta ubicación en la zona del Golfo de Bengala, cómo los piratas Singh degollaban a su padre. Recogido por los Bandar, una tribu de pigmeos asentada en la jungla profunda, y tratado como un Dios jura, ante el cráneo de uno de los piratas, no sólo vengarse de los Singhs y dedicar toda su existencia al exterminio de estos malhechores sino también que sus descendientes se comprometerían a esa misma tarea: <i>Por mucho que mi descendencia se perpetúe sobre la Tierra, juro que el primogénito de cada generación continuará mi obra. </i> Nuestro héroe aclara: <i>¡El fue el primer “Fantasma”! ¡Esto sucedió hace 417 años! ¡Soy su descendiente y, como tal, obligado a respetar su juramento!</i></div>
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Un ceñido traje de color violáceo y una máscara que oculta su rostro mantienen la leyenda de su inmortalidad. El Espíritu que anda, el Duende que camina, batalla incansable contra el Mal en todos los escenarios.
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Cada semana aguardaba impaciente la llegada del cuadernillo que ya había reservado en la Librería Miranda y que la solícita Juanita, “Ata”, buscaba y me entregaba. Febril, volaba hasta mi casa para sumergirme en sus peripecias. <i>Juan Centella</i>, que hasta entonces había sido mi personaje favorito, se fue poco a poco difuminando y perdiendo consistencia ante esta nueva y formidable encarnadura del héroe.
¿Cómo elige uno a sus héroes? Esta pregunta me ha asaltado en más de una ocasión y no he sido capaz de responderla. ¿Qué podía atraerme de un personaje, <i>Juan Centella, </i>que, creado usando la fisonomía del boxeador Primo Carnera y algunos rasgos del Duce, Benito Mussolini, aplicaba con demasiada frecuencia la dialéctica de los puños para solucionar problemas? ¿Por qué me fascinaba el héroe enmascarado, <i>El Fantasma,</i> que dictaba justicia y mantenía el orden en territorio de colonias y en cuya presencia se sentían atemorizados los villanos y los nativos?
De hecho, observado en perspectiva y utilizando las armas de la crítica bienpensante, mis referentes dejan bastante que desear: un matón fascistoide y un justiciero que encarnaba la superioridad de la raza blanca. Pero, ¿es que acaso eran más aceptables <i>El Guerrero del Antifaz </i>o <i>Roberto Alcázar</i>, quienes encandilaban a muchos de mis compañeros, o cualquiera de los muchos héroes que han poblado y pueblan el imaginario popular? En aquella época, poco nos importaba el contexto y tampoco estaban los tiempos para héroes políticamente correctos, ¡ni falta que hacía! </div>
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La Librería Miranda, desaparecida en diciembre de 2008, jugó un papel importante en la educación sentimental de gran parte de los jóvenes de clase media de la generación de posguerra. En mi caso en mayor medida porque, probablemente a causa de nuestra relación familiar –mi tío Felipe estaba casado con Isabel, una de las hijas del fundador de esa institución–, podía, en una primera etapa, llevarme a casa y leer gratis, con sumo cuidado ¡eso sí! y sin cortar los cerrados bordes de sus hojas, tebeos diversos y, luego, ya más talludito, libros de los que hacía un informe para el gestor de la librería, Vicente Miranda, y que él utilizaba para recomendarlos. Así leí, “tochos” como <i>El diablo a las cuatro </i>y <i>El manantial </i>entre otros muchos. Compartía este privilegio, el de “asesor literario”, con uno de sus sobrinos, Francis Miranda, y con su hija, Quirinita. </div>
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Las novelas baratas, las novelas populares, son, como las define Fernando Savater, <i>el retazo más humilde del tejido con el que se fabrican los sueños</i>; así es en cualquier cultura y en cualquier época pero en mucha mayor medida en momentos de penuria, cuando mayor necesidad hay de soñar. La posguerra española fue uno de esos momentos y esas novelitas de portadas en colores vivos, de títulos que anunciaban aventuras y presagiaban misterio, el alimento de esos sueños en los que era posible escapar de la grisura de un tiempo de retórica hueca y de escasez y miedo reales. A la <i>Colección Hombres Audaces</i> de la Editorial Molino, que tenía entre sus series las aventuras de Bill Barnes, Doc Savage, Pete Rice y La Sombra, entre otras, llegué a través del préstamo: Mingo Carrasco me pasaba los ejemplares que pertenecían a su hermano mayor Lito, entonces estudiando Medicina en Granada. De todos estos personajes mi preferido era, sin duda, <i>Doc Savage, el Hombre de Bronce</i>, título de su primera aventura y apelativo con el que se conoce al héroe creado por Kenneth Robeson, seudónimo del escritor norteamericano Lester Dent.<br />
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Así comenzaba esa novela cuyo Capítulo I tenía el sugerente título de <i>El hombre siniestro</i>: </div>
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<i>Cerníase la muerte en la densa oscuridad.
Avanzaba furtiva por una viga de hierro, mientras a centenares de metros de profundidad se abrían esas grietas con paredes de cristal y ladrillos que son las calles de Nueva York.
Sobre el asfaltado, los trabajadores de los últimos turnos regresaban presurosos a sus hogares.
La fina y persistente lluvia les obligaba a guarecerse bajo los paraguas, y no perdían el tiempo escudriñando las alturas.
Aunque de hacerlo es probable que no hubiesen observado nada. La noche era oscura como boca de lobo.
Del cielo, cubierto de negros nubarrones, se desprendía una niebla que flotaba opresiva de las azoteas alrededor de los imponentes edificios.
Un rascacielos en construcción, edificado hasta el piso ochenta, se destacaba sobre el fondo oscuro del firmamento.
Por encima del último piso, una torre metálica ornamental, aún sin el menor vestimiento de mampostería, se elevaba unos setenta metros más.
Las viguetas formaban un gigantesco esqueleto de acero. Los hierros, desnudos y traicioneros, aparentaban la siniestra impasibilidad de lo inerme.
Sin embargo, entre ellos rondaba la Muerte.
Una Muerte en forma de hombre.
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¿Quien podía resistirse a seguir leyendo? ¿Acaso nos importaba la escasa calidad literaria del relato? </div>
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<i>Parecía poseer la agilidad de un felino, saltando y escalando sin el menor tropiezo en la impenetrable oscuridad.
La lluvia mojaba su rostro, pero el hombre seguía avanzando, empujado por un propósito terrible y siniestro.
De vez en cuando, el desconocido pronunciaba palabras extrañas e ininteligibles [...].
—¡Debe morir! —murmuraba el hombre roncamente, en su lengua extraña—. ¡Lo ha decretado el Hijo de la Serpiente Emplumada! ¡Esta noche! ¡Esta noche la muerte asestará su golpe!
[...] La lluvia le empapaba. Las terribles fauces de acero se abrían a sus pies; y un resbalón significaría la muerte. Escalaba metro tras metro.
[...] El hombre depositó en el suelo su caja negra. Su bolsillo interior reveló la existencia de unos gemelos de gran potencia.
El hombre de los dedos rojos enfocó sus lentes sobre el piso inferior de un rascacielos, a varias manzanas de distancia.
[...] Sus lentes se movieron a derecha e izquierda hasta hallar una ventana iluminada. Se encontraba situada en la parte oeste del edificio.
Aunque ligeramente velado por la lluvia, los potentes prismáticos revelaron al detalle lo que había en la habitación.
Se destacaba con claridad la parte superior de una mesa de despacho maciza, ancha y pulida, situada delante mismo de la ventana.
¡Al otro lado había una figura de bronce!
Representaba la cabeza y hombros de un hombre esculpido en metal amarillento rojizo. Aquel busto era un espectáculo sorprendente.
[...] El hombre de los dedos rojos se estremeció.
[...] Una vez más se llevó los prismáticos a los ojos, enfocándolos sobre la asombrosa estatua de bronce.
La obra maestra abrió la boca, bostezó... ¡pues no era ninguna estatua, sino un ser viviente!
El hombre de bronce mostró al bostezar unos dientes anchos y fuertes.
Sentado ante la enorme mesa, no parecía ser un hombre de tal corpulencia, un observador dudaría que tuviera dos metros de estatura... y se habría asombrado al saber que pesaba doscientas libras.
[...] Este hombre era Clark Savage júnior.
—¡Doc Savage! ¡El hombre cuyo nombre era un símbolo en los rincones más extraños y apartados del mundo!</i> </div>
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A la mortecina luz de la lámpara de mi mesa de noche, dilataba el momento de dejar la novela instado por las órdenes reiteradas y repetidas de mis padres: <i>¡Miguelito, apaga ya! ¡Mira que mañana tienes que levantarte temprano para ir al colegio! </i></div>
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El estudio publicado por Ediciones Robel, <i>La novela popular en España, </i>ofrece un amplio recorrido por las obras y autores que dedicaron su tiempo a mitigar las profundas heridas que había dejado la reciente contienda fratricida y a evadirse, así, de un pasado que se quería olvidar y de un presente que, aunque envuelto en retórica imperial, era, para muchos, gris, plomizo y vengativo. Según supimos más tarde el mundo de la novela popular de posguerra resultó ser refugio de personajes desafectos al régimen y medio de vida para unos prolíficos escritores que traducían y creaban, muchas veces ocultos tras un seudónimo, personajes con los que soñar en una España empobrecida. </div>
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De entre los autores dejaré constancia de un nombre, Guillermo López Hipkiss creador de <i>El Encapuchado</i>, que para mí tiene especiales resonancias porque aparecía como traductor de varias de las obras, protagonizadas por Guillermo Brown, del para nosotros enigmatico y misterioso escritor –¡suponíamos entonces!– que se ocultaba tras el nombre de Richmal Crompton y que resultó ser, como descubrí mucho más tarde, una escritora. </div>
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¿Por qué me gustaban tanto las aventuras de aquél mozalbete que gastaba monedas, de las que nunca supimos su equivalencia y relación –peniques y medios peniques, chelines, coronas y medias coronas–, en extraños mejunjes –agua de regaliz o jugo de grosella, entre otros– o en golosinas de misterioso nombre y que se refugiaba en un chamizo, al que llamaba “El cobertizo”, desde el que, en compañía de los otros “Proscritos” –Enrique, “Pelirojo” y Douglas– y su perro Jumble, diseñaba complicados, pero siempre sugerentes, planes con los que alterar el aburrido y encorsetado trajín de los mayores?
La anarquía y la libertad que se desprendía de las páginas de aquellos libritos de pastas duras en intenso color rojo era irresistible. </div>
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Así se inicia “Guillermo el Proscrito”:
<i>Guillermo, Enrique, Pelirrojo y Douglas (conocidos bajo el nombre de “Los Proscritos”) caminaban, lentamente, en dirección al colegio.
Era una tarde muy hermosa, una de esas tardes en que a uno le parece (a los Proscritos desde luego les parecía) una ingratitud pasárselo encerrado entre cuatro paredes. El sol brillaba y los pájaros cantaban invitadores… </i></div>
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Y así “Guillermo el Conquistador”:
<i>Guillermo y el deshollinador simpatizaron inmediatamente. A Guillermo le gustó el colorido del deshollinador y a este le gustó la conversación de Guillermo. El niño miraba al hombre como a un personaje de orden superior.
¿No le importó a su madre que fuera usted deshollinador? – preguntó, maravillado, al desatar el hombre los cepillos.
Nooo – contestó el interpelado lenta y pensativamente – no dijo nada, por lo menos.
No necesitará usted un socio, ¿verdad? No me importaría ser deshollinador. Iría a vivir con usted y le acompañaría todos los días a hacer la ronda… </i></div>
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¿Cómo no dejarse seducir por unas historias de comienzo tan prometedor?
¡El lecho de paja, bajo los tomateros, me esperaba! Horas de ensoñación en tardes soleadas. </div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-75705002232082028012012-07-21T16:40:00.002+01:002012-12-16T18:37:07.457+00:00REGENERAR LA POLÍTICAHojeó el periódico y no pudo evitar un sobresalto; allí, en primera página, en titulares aparecían las noticias. En una de ellas podía leerse: Mariano Rajoy critica la gestión y el despilfarro de Camps en la Comunidad Valenciano y censura a Fabra por la construcción del aeropuerto de Castellón y en la otra: Alfredo Pérez Rubalcaba considera incomprensible el escaso control ejercido por los ejecutivos de Chávez y Griñán sobre el dinero de los ERE en Andalucía.
Siguió leyendo y su desasosiego se acentuó; ambos afirmaban su propósito de exigir responsabilidades por una gestión manifiestamente mejorable así como su disposición a colaborar con la justicia en la investigación que, a su juicio debía iniciarse.
De pronto, sin saber cómo ni por qué, las páginas parecieron esfumarse y una difusa claridad ocupó su espacio visual; el suave calor de las sábanas le devolvió a la realidad.miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-3359756868640094782012-07-13T22:17:00.001+01:002012-07-16T19:59:53.014+01:00Manejar la informacion en tiempos de crisisA medida que avanza el proceso de ocupacion de las instituciones por parte del PP, va quedando claro lo que pretenden: retornar a unas prácticas en las que priman la manipulación y el engaño frente a la información y la verdad.
No se duda,así, en retorcer el lenguaje hasta desnaturalizarlo -siguiendo las enseñanzas desplegadas en las sociedades totalitarias- ni, tampoco, en tomar por asalto los medios de comunicación públicos -eliminando a los independientes y desafectos y colocando a los afines y fieles.
El temor, el desasosiego y la resignación ante una crisis de la que se culpabiliza siempre al otro -el Gobierno anterior, Merkel, Bruselas, etc.-, y que se nos vende como inevitable ha servido, y aun sirve, para mantener maniatada a una sociedad que, poco a poco, comienza a entender el alcance de esta contrarreforma que amenaza con dinamitar conquistas que nos habían convertido en ciudadanos.
De ahí esa precipitación por controlar la información, de ahí la amenaza que se cierne sobre nosotros.miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-5801172711226251102011-11-16T15:39:00.001+00:002012-11-05T19:30:35.604+00:00VIERA EN LA CIENCIA DE SU TIEMPO (IV): EL NACIMIENTO DE LA QUÍMICA MODERNA<br />
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<b><span style="font-size: 11pt;">LOS AIRES FIJOS EN EL CONTEXTO
DE LA QUÍMICA DE LA ÉPOCA</span></b></div>
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<span style="font-size: 11pt;">En el relato de sus viaje
a Francia, Viera apunta, el 9 de Agosto de 1777: <i>(...) Posta y media a Baraque y lo mismo a Dijon, en donde llegamos a
las 11 (...).</i> Por la tarde visitará la Academia de Ciencias, en la que,
según deja escrito: <i> En la sala para los experimentos de física,
hay diferentes instrumentos y máquinas, entre ellas una eléctrica con dos
discos de vidrio. Aquí vi por la primera vez el modo de extraer el aire fijo e
inflamable con algunos de sus efectos.</i> ¿Qué son estos <i>aires </i>a los que se hace mención? ¿Por qué su <i>asunto era a la sazón muy de moda y digno de interesar la curiosidad de
los amantes de las ciencias</i>? ¿Por qué se convertirá en un tema tan
atractivo para Viera hasta el extremo de dedicarle el poema que publicamos?.</span></div>
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<span style="font-size: 11pt;">A fin de situar en su
contexto el poema de Viera <i>Los aires
fixos</i>, es conveniente señalar que es precisamente durante la época en que
aquél es escrito cuando tiene lugar lo que acabará denominándose Revolución
Química. </span></div>
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<span style="font-size: 11pt;">En este proceso jugará un papel esencial, la constatación de que el aire no es
un elemento simple sino un estado físico que podían asumir muchas sustancias de
composición química y propiedades muy diferentes y que el más común de los
aires, el atmosférico, no es otra cosa que una mezcla de diversos aires. </span></div>
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<span style="font-size: 11pt;">La
Química basada en los, hasta entonces denominados, cuatro elementos dejará paso
a otra, más rica y compleja, en la que no sólo la elementalidad de aquellos
quedará irremisiblemente cuestionada sino que la propia noción de elementalidad
pasará a ser definida, no en términos filosóficos, sino operativos: <i>No dejará de extrañarse que en un tratado
elemental de química </i>–dirá Lavoisier– <i>no
aparezca un capítulo sobre las partes constituyentes y elementales de los
cuerpos; pero he de advertir aquí que la manía que tenemos de que todos los
cuerpos naturales se compongan únicamente de tres o cuatro elementos se debe a
un prejuicio heredado de los filósofos griegos. Admitir que cuatro elementos
componen todos los cuerpos conocidos sólo por la diversidad de sus
proporciones, es una mera conjetura imaginada mucho antes de que se tuviesen
las primeras nociones de la física experimental y de la química. Se carecía aún
de hechos, y sin ellos se creaban sistemas, y hoy que los poseemos parece que
nos empeñamos en rechazarlos cuando no se adaptan a nuestros prejuicios (...).
Todo lo que puede decirse sobre el número y naturaleza de los elementos se
reduce, en mi opinión, a puras discusiones metafísicas: solo se intenta
resolver problemas indeterminados susceptibles de infinitas soluciones, ninguna
de las cuales con toda probabilidad, será acorde con la naturaleza. Me
contentaré, pues, con decir que si por el nombre de elementos queremos designar
a las moléculas simples e indivisibles que componen los cuerpos, es probable
que las ignoremos, pero si, por el contrario, unimos el nombre de elementos o
principios de los cuerpos, la idea del último término al que se llega por vía
analítica, entonces todas las sustancias que hasta ahora no hemos podido
descomponer por cualquier medio serán para nosotros otros tantos elementos; con
esto no queremos asegurar que los cuerpos que consideremos como simples no se
hallen compuestos por dos o mayor número de principios, sino que como nunca se
ha logrado separarlos, o mejor dicho, faltándonos los medios para hacerlo,
debemos considerarlos cuerpos simples y no compuestos hasta que la experiencia
y la observación no demuestren lo contrario.
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<span style="font-size: 11pt;">Tierra, Agua y Aire
mostrarán su complejidad a lo largo del siglo XVIII y al mismo tiempo todo un
cúmulo de extrañas propiedades, que hasta entonces habían parecido mágicas,
comenzarán a recibir una explicación científica. Entre estas extrañas
propiedades, y por la relevancia que tienen para nuestro estudio, cabe señalar <i>algo</i> que era común al aire y al fuego:
su capacidad para permanecer <i>fijados</i>,
ocultos en las sustancias sólidas y liquidas.</span></div>
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<span style="font-size: 11pt;">En efecto, Stephen Hales en su
obra <i>Vegetable Staticks</i> <i>(1727)</i> –como subproducto de sus
estudios sobre ciertos aspectos de la fisiología vegetal– había dejado
constancia de la posibilidad de liberar cantidades considerables de <i>aire</i> mediante la destilación destructiva
de numerosos sólidos y líquidos tanto inorgánicos como orgánicos. Esta
propiedad sorprendente, que el aire pudiera ser fijado en estado inelástico en
la materia sólida, se convirtió en objeto de investigación y el control del o
de los aires pasó a formar parte del trabajo del químico, revelándose esencial en
el subsiguiente proceso de cuantificación de esta disciplina. El fuego, por
otra parte, también era capaz de permanecer fijado, latente, como lo pondría de
manifiesto Joseph Black durante sus investigaciones, también en curso durante
este periodo, sobre la naturaleza del calor: su materialidad acabaría
esfumándose. </span></div>
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<span style="font-size: 11pt;">A finales del siglo XVIII y comienzos del XIX los cuatro elementos
perderían su condición primordial y un nuevo paradigma explicativo iría poco a
poco articulándose emergiendo una nueva teoría sobre la constitución de la
materia y sus transformaciones. Viera ya no sería testigo de esa nueva
época. </span></div>
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<span style="font-size: 11pt;">Nuestro personaje
aparece, en la encrucijada que supone la Revolución Química entonces en curso,
profundamente influido y dominado por las viejas ideas que había adquirido
durante su estancia parisina bajo el magisterio de Sigaud y Balthazar Sage
defensores, como muchos otros químicos, de la teoría del flogisto. Su
resistencia al cambio que esa revolución supuso, del que no está claro si tuvo
cumplida noticia a través de la <i>Encyclopédie
methodique ou par ordre de matièries</i>, corroboraría, de cualquier modo, lo
que Lavoisier había previsto al señalar en 1783, con referencia a su <i>Memoria sobre la combustión en general</i>: <i>No espero que mis ideas sean adoptadas de
golpe; el espíritu humano se pliega a una manera de ver, y a los que han
considerado la naturaleza bajo cierto punto de vista durante una cierta parte
de su carrera, les cuesta trabajo pasarse a ideas nuevas.</i> </span></div>
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<span style="font-size: 11pt;">No debe sorprendernos,
pues, que Viera, alejado ya de los centros culturales y retirado en Gran
Canaria, permanezca en gran medida anclado en el antiguo andamiaje químico en
el que, por otra parte, se mueve con soltura. Así lo atestiguan no sólo las
referencias que, sobre el <i>flogisto</i>,
aparecen en el poema sobre <i>Los aires
fijos</i> sino también el uso de la <i>teoría
de las afinidades</i> como elemento explicativo de las reacciones que tienen
lugar en el proceso de análisis de las aguas de Teror o Telde, tema éste al que
dedicará algunas de las <i>Memorias
presentadas y leídas en la Real Sociedad de Amigos del País de la ciudad e isla
de Gran Canaria</i>, de las que, como ejemplo de la prosa clara y precisa
utilizada por arcediano en sus informes científicos, incluimos un fragmento: <i>Como el agua es en la naturaleza un producto
disolvente de diversas sustancias, no es mucho que aún las fuentes que parecen
más puras contengan partículas de diferentes tierras, sales o minerales; por
cuya razón se pueden llamar todas, en cierto modo, Minerales; si bien solo se
conocen comúnmente con ese nombre aquellas aguas en que los sentidos perciben
alguna extraña impresión.</i></span></div>
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<i><span style="font-size: 11pt;">Conviene mucho conocer cuales son estas varias sustancias
disueltas en aquellas aguas de que usamos o de que queramos usar, supuesto que
se interesa en ello nuestra salud, y aún las ventajas de algunas artes: y el
camino que hay, para llegar a ese conocimiento es el del análisis. Debémoslo a
la Química, pues esta ciencia (una de las ramas más útiles y agradables de la
Física) con su doctrina de las afinidades y sales ha ofrecido a los hombres dos
sendas para facilitar dicho examen: la una es la de los reactivos, la otra la
de la evaporación o destilación.</span></i></div>
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<i><span style="font-size: 11pt;">Llamamos reactivos químicos o precipitantes, aquellos líquidos
o sustancias que incorporadas con el agua que se busca analizar, alteran al
instante o en muy poco tiempo su transparencia, y ocasionando en las partículas
heterogéneas de que consta una forzosa combinación o precipitación, por un
efecto de las respectivas afinidades, se echan luego de ver por ellas cuales
son los principios de que las tales aguas se componen.</span></i></div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-21533363130933224582011-11-13T17:32:00.001+00:002012-11-05T19:15:32.298+00:00VIERA EN LA CIENCIA DE SU TIEMPO (III): VIERA COMO DIVULGADOR<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhe9ROSyBtvUsk8r9-ToutJUTootSFaPA_dLocilPya6cJniV9yBM8vgwakmKIqJTgZqEUfFR_wtFQ9Vhvnz3fscU7PCG1RB7D4Bgv1m9bNyGWtLD65J2eDroDEzwPpBkgzoAWCVshXEss/s1600/viera+3.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhe9ROSyBtvUsk8r9-ToutJUTootSFaPA_dLocilPya6cJniV9yBM8vgwakmKIqJTgZqEUfFR_wtFQ9Vhvnz3fscU7PCG1RB7D4Bgv1m9bNyGWtLD65J2eDroDEzwPpBkgzoAWCVshXEss/s1600/viera+3.jpeg" /> </a></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Como en la mayor parte de los ilustrados hay en
Viera una clara vocación divulgadora y una conciencia clara de los problemas
que dificultan la extensión de las luces en su país. Cañuelo, en su discurso <i>Al que del necio error supo librarse</i>,
presentaba de modo nítido los problemas que dificultaban la ilustración
española: <i>(...) Pero el que no sabe es,
dice el refrán castellano, como el que no ve. Y así como el que no ve no puede
acertar en nada, así tampoco el que no sabe. Por consiguiente, importa poco que
en una nación haya un número de ciudadanos por grande que sea, como seguramente
le hay entre nosotros, dotados de las suficientes luces y que sepan distinguir
entre la verdad y el error y separar lo precioso de lo vil; si, no obstante, el
número mayor de ellos se halla a oscuras, esto es, si la ignorancia, la
preocupación y el error son más comunes. De nada sirven las luces de los
primeros sino en cuanto pueden alumbrar a los segundos. Y si en lugar de
colocar aquellos su luz sobre el candelero para que ilumine a todos los que
están en la nación, se ven obligados a ocultarla bajo el medio celemín, como
más en la nuestra que en ninguna otra de las de Europa sucede, ¿habrá que
maravillarse de que esta nación sea tenida por más ignorante que otras y que
sienta más que ellas los funestos efectos de los errores comunes?. De los
errores digo, que son el origen de toda especie de mal.</i></span></div>
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<i><span lang="ES-TRAD" style="font-size: 11pt;">Mas ¿cuál es la causa que se opone a los
progresos de la luz? ¿Cuál la que impide el que se comunique a todos o al mayor
número? ¿Cuál la que obliga a tantos como la tienen encendida a que la apaguen
o la oculten? ¿Cuál la que se opone a la enseñanza de la naturaleza,
manteniendo el error que fácilmente se disiparía si pudiese comunicarse la luz
y pasar de unos en otros, aumentándose más y más por esta misma comunicación?
(...) ¿Cuál ha de ser?. El vil interés de algunos pocos a quienes conviene que
la ignorancia y los errores sean comunes, y que por nuestra desgracia tiene
aquí más fuerza que en ninguna parte.</span></i><span lang="ES-TRAD" style="font-size: 11pt; font-style: normal;"> </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-style: normal;">Resulta
evidente a juicio de Viera, y al de los ilustrados de la época, que sólo la
extensión de las luces permitirá disipar el error. Divulgar es, pues, esencial
como gesto político, pero no sólo es eso, porque esa divulgación científica
ayuda también al conocimiento de una Creación que realza la bondad y el poder
divinos y muestra, al mismo tiempo, la capacidad de la razón humana y las
utilidades de la ciencia. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Viera responde a tal patrón y a lo largo de su
dilatada existencia se aplicará a esta tarea divulgadora no solo de ciertos
aspectos de la ciencia del momento – de las que su máximo exponente es el <i>Diccionario de Historia Natural de las Islas
Canarias</i> y también las obritas que aquí publicamos –, sino también de las
virtudes y utilidades de las artes y oficios prácticos – véanse como ejemplo
las diversas memorias para la Sociedad Económica o el <i>Librito de la Doctrina Rural</i> –. Artes y oficios prácticos que la
gran obra del momento – la <i>Enciclopedie </i>–
se había propuesto dignificar abriéndoles sus páginas con una extensión y una
prolijidad de detalles que no tenía, hasta entonces, parangón; no es extraño,
pues, que los ecos de esa empresa se encuentren en los objetivos de las
Sociedades Patrióticas y en las obras y trabajos de sus miembros. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Las obritas que editamos fueron escritas por Viera
en distintas épocas de su vida y con intenciones concretas diferentes. Así, las
<i>Noticias del Cielo</i> en 1771 para
ayudar a la educación de su pupilo; la versión inicial de los <i>Aires fijos</i> en torno a 1779 - 80 y los
cantos añadidos en 1781 con la pretensión de complementar sus demostraciones
físico-químicas; <i>Las Bodas de las plantas
</i>finalizada en 1806 como vehículo para difundir las ideas de Linneo. En
todas, sin embargo, está presente ese afán divulgador al que repetidas veces
hemos hecho mención.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">NOTICIAS DEL CIELO
O ASTRONOMÍA PARA NIÑOS</span></h1>
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<span lang="ES-TRAD" style="font-size: 11pt;">La importancia de Descartes, al que hacen reiterada
alusión los ilustrados y anti ilustrados españoles, en la configuración del
modo de pensar del siglo XVIII es reconocida por el mismo D’Alembert en el
frontispicio de la obra que quedará como emblema del periodo: la <i>Enciclopedia</i>. En el <i>Discurso preliminar</i> afirma: <i>(...)
Al menos, Descartes se ha atrevido a enseñar a los espíritus sanos a sacudir el
yugo de la escolástica, de la opinión, de la autoridad, en una palabra: de los
prejuicios y de la barbarie. Gracias a esta revolución, cuyos frutos cosechamos
hoy se ha hecho a la filosofía un favor más esencial quizás que todos los que
se debe a sus ilustres sucesores ... Si acabó por creerse capaz de explicarlo
todo, al menos empezó por dudar de todo; y las armas mismas de que nos valemos
para combatirle, no le pertenecen menos por el hecho de que las dirijamos
contra él...</i> </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Su mérito es, pues, valorado, a pesar de que en ese
momento su concepción del mundo haya perdido presencia frente al éxito de
Newton, y su sistema, articulado en torno a las ideas innatas, se vea
contestado por el empirismo lockeano. </span><br />
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<span lang="ES-TRAD" style="font-size: 11pt;">Condorcet, por otra parte, en el <i>Bosquejo de un cuadro histórico de los
progresos del espíritu humano </i>(1794), reflejará este estado de cosas cuando
escribe: <i>(...) Desde el momento en que el
genio de Descartes imprimió a los espíritus aquel impulso general, primer
principio de una revolución en los destinos de la especie humana, hasta la
época feliz de la total y pura libertad social, en la que el hombre no ha
podido reemplazar su independencia natural más que después de haber pasado por
una larga sucesión de siglos de esclavitud y de infortunio, el cuadro del
progreso de las ciencias matemáticas y físicas nos presenta un horizonte
inmenso, cuyas diversas partes hay que distribuir y ordenar, si se quiere
captar bien su conjunto, observar bien sus relaciones.</i></span></div>
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<i><span lang="ES-TRAD" style="font-size: 11pt;">No solamente la
aplicación del álgebra a la geometría se convirtió en una profunda fuente de
descubrimientos en esas dos ciencias, sino que, al demostrar, mediante ese gran
ejemplo, cómo los métodos del cálculo de las magnitudes en general podían
aplicarse a todas las cuestiones que tenían por objeto la medida de la
extensión, Descartes anunciaba anticipadamente que tales métodos se emplearían,
con un éxito igual, en todos los objetos cuyas relaciones sean susceptibles de
una valoración precisa; y este gran descubrimiento, al mostrar por primera vez
ese último objetivo de las ciencias – someter todas las verdades al rigor del
cálculo – despertaba la esperanza de alcanzarlo y permitía vislumbrar los
medios.</span></i></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">A este primer paso seguirían otros en el campo de la
matemática: Newton y Leibniz inventan y desarrollan el cálculo infinitesimal
mediante el que se consigue <i>atrapar lo
móvil</i> y con ello dotarse de una herramienta indispensable para entender el
cambiante mundo de los fenómenos. La Mecánica se convierte en ciencia
cuantitativa y lo que resulta aún más importante, se unifica el ámbito de lo
terrestre y lo celeste al obtener Newton la ley de Gravitación Universal. Este
descubrimiento adquiere una dimensión que trasciende el ámbito de esta vieja
disciplina – la Astronomía – para convertirse en ejemplo y en, digámoslo así,
revelación:</span><i><span lang="ES-TRAD" style="font-size: 11pt;"> (...) Así, el hombre ha
acabado conociendo, por primera vez, una de las leyes físicas del universo, y
ésta es única todavía hasta ahora, como la gloria del que la ha revelado.</span></i></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Cien años de trabajos han confirmado esta
ley, a la que todos los fenómenos celestes han parecido hallarse sometidos, con
una exactitud , por así decirlo, milagrosa <i>(...) Pero Newton acaso hizo más por
los progresos del espíritu humano que haber descubierto esa ley general de la
naturaleza; enseñó a los hombres a no admitir ya, en la física, más que teorías
precisas y calculadas, que explicasen, no solamente la existencia de un
fenómeno, sino también su calidad y su extensión. (...) </i>La física, al
liberarse, poco a poco, de las vagas explicaciones introducidas por Descartes,
de igual modo que se había desembarazado de los absurdos escolásticos, ya no
fue más que el arte de interrogar a la naturaleza mediante experiencias, para
tratar luego de deducir de ellas, mediante el cálculo, unos hechos más
generales. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">No desconocía Viera las teorías astronómicas
de Newton, que su admirado Voltaire junto a Madame de Chatelet pugnaron por
introducir en el Continente y así en <i>Las
Noticias del Cielo</i> no solo reivindica la cinemática copernicana revisada
por Kepler, arremete contra las viejas concepciones ptolemaicas o introduce, en
el lenguaje de la época, la dinámica newtoniana sino que incluso admite la
posibilidad de otros mundos habitados. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Así se refiere a las causas de la estructura
del sistema planetario:</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-variant: small-caps;">Pregunta</span><span lang="ES-TRAD" style="font-size: 11pt;">: <i>Ahora
queda que satisfacer la duda que cómo tantos y tan grandes cuerpos Planetarios
pueden mantenerse suspensos en el espacio etéreo; y qué fuerza secreta puede
ser la que los retiene en sus órbitas y los obliga a circular con tanta
regularidad y armonía...</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-variant: small-caps;">Respuesta</span><span lang="ES-TRAD" style="font-size: 11pt;">: <i>Este
prodigio es obra de la pesantez, que penetra todos los cuerpos de la
naturaleza, y de la atracción con que se dirigen los unos hacia los otros según
sus tamaños y sus distancias. Así, los Planetas gravitan hacia el Sol como el
centro común del sistema, y los Satélites, hacia sus Planetas respectivos.</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-variant: small-caps;">P</span><span lang="ES-TRAD" style="font-size: 11pt;">: <i>Pues si
gravitan hacia sus centros, ¿cómo es que no se precipitan en ellos?</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">R: <i>Porque
tienen que obedecer a otro movimiento de proyección; esto es, a aquel
movimiento que tienen los cuerpos arrojado, con el cual van huyendo constantemente
del mismo punto céntrico que los atrae. Por eso, aunque la piedra de una honda
es atraída al centro de la mano por el cordel, se aparta al mismo paso de ella
a fuerza del movimiento de rotación con el que es impelida. </i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Popularizado por Fontenelle que en sus <i>Conversaciones sobre la pluralidad de los
mundos</i> llega a utilizarlo como recurso galante, el tema de los mundos
habitados, tan caro en siglos pasados para heterodoxos como Bruno, aparece,
ahora, de modo recurrente a lo largo del periodo y encuentra eco en el texto de
Viera:</span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEilgdacy2ATsfmR-BmWbnDngU468QjQxti6fZelS2KcPx1LzUG3AdaTpIKBrs0bx-TOvnt7l5Wq7gPhvLyG6KzoH2d5ssFVNVa0Y5JFldXmac-_qlVzKOkTk0ZZ14w89HRRnhs-fQr41Ek/s1600/pluralidad+fontenelle.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEilgdacy2ATsfmR-BmWbnDngU468QjQxti6fZelS2KcPx1LzUG3AdaTpIKBrs0bx-TOvnt7l5Wq7gPhvLyG6KzoH2d5ssFVNVa0Y5JFldXmac-_qlVzKOkTk0ZZ14w89HRRnhs-fQr41Ek/s1600/pluralidad+fontenelle.jpeg" /></a></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-variant: small-caps;">pregunta: </span><i><span lang="ES-TRAD" style="font-size: 11pt;">Después de haber hablado
de los Planetas ¿qué diremos de las estrellas fijas? </span></i><span lang="ES-TRAD" style="font-size: 11pt;"></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-variant: small-caps;">respuesta: </span><i><span lang="ES-TRAD" style="font-size: 11pt;">Que
son otros tantos Soles esparcidos por la vasta extensión de los cielos, de los
cuales los más brillantes (por eso parece que son los más que se nos avecinan)
nos quedan 27000 veces más lejos que lo que nos queda nuestro Sol: esto es,
siete millones de leguas.</span></i></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-variant: small-caps;">p: </span><i><span lang="ES-TRAD" style="font-size: 11pt;">¿Estos
Soles innumerables, serán por ventura otros tantos sistemas como el nuestro,
con Planetas habitados que giran alrededor de ellos, dando vueltas sobre sus
propios Polos?</span></i></div>
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<span lang="ES-TRAD" style="font-size: 11pt; font-variant: small-caps;">r: </span><i><span lang="ES-TRAD" style="font-size: 11pt;">Nada,
a la verdad, es más verosímil ni más probable.</span></i></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgrYPDsm_Y9kq94iBf4xmhemRXYEyN1XQVLJ-W_1ZJqq-PSP4vVkZLeXjpQ6QzqJaP9SCO9oSoPACB2KL_KW12tZ6fdsVtDhdLmuGxvPGcsIMoaLzWEWRePB-4KlhdbMGzxHvPh_Q6COG0/s1600/kepler.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><br /></a></div>
<span lang="ES-TRAD" style="font-size: 11pt;">Aunque parece fuera de toda duda que la inspiración
primera haya que buscarla en el maravilloso texto divulgativo de Fontenelle, la
referencia más inmediata y la argumentación que sustenta afirmaciones
aparentemente tan osadas la halló Viera, sin duda, en su maestro y amigo
parisino Sigaud de la Fond quien en el texto <i>Elementos de Física Teórica y Experimental</i> escribe: <i>Son, pues, las estrellas fijas, como hemos
dicho, otros tantos Soles semejantes al nuestro, separados entre sí por
inmensas distancias; por lo cual en nada parece conveniente a la Divina
Sabiduría, el decir que todos estos innumerables cuerpos de luz han sido
criados solitarios, sin tener alrededor otros cuerpos a quien hacer
resplandecer con su luz, y fomentar con su calor; bien se puede pues afirmar
que Dios nada ha criado inútil, ni en vano. Por lo que parece verosímil que
cada una de las estrellas esté rodeada de planetas, que la acompañan como hemos
dicho del Sol, y que haya tantos sistemas semejantes al del Sol, cuantas hay en
el cielo fijas, ejerciendo cada una en su sistema el mismo cargo que el Sol en
el sistema solar. Si esto es así ¡qué admirable y magnífica la idea que se nos
representa de la extensión del Universo! Quedando hecho éste un teatro
nobilísimo de la Divina sabiduría, Omnipotencia, Bondad e infinita Gloria de
Dios: principalmente si viéramos que cada uno de los Planetas es morada y
habitado, como es muy verosímil, lo mismo que la Tierra, de vivientes y
criaturas racionales.</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">La capacidad explicativa y la capacidad de prever
que poseía la teoría newtoniana mutó en optimismo el desconcierto generado en
un principio por el desalojo brutal del hombre de su posición central en el
Cosmos. La aprensión suscitada por la inmensidad del Universo y la aparente
soledad del hombre en él se mitigó gracias a la convicción creciente de que el
mundo funcionaba de acuerdo a leyes invariables a las que, como la ley de
gravitación mostraba, se podía acceder. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">No es extraño, pues, que el denominado <i>programa de Newton</i> – la explicación
última de los fenómenos de la Naturaleza, químicos, eléctricos, térmicos, etc.,
en términos de materia (átomos) y fuerza – se tratara de aplicar a las nuevas
ciencias que, demarcando paulatinamente su territorio, recibirían un notable
impulso. La Química, la Electricidad, la Fisiología vegetal y animal, la
Calorimetría, etc., se liberarán, a partir de entonces y no sin dificultades,
de sus adherencias mágicas y animistas, mecanizándose.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Este avance científico tendrá su correlato en el
ámbito de la aplicación práctica y así,
los avances en mecánica, astronomía y óptica fecundarán el <i>arte de construir, de mover y de dirigir barcos</i>, la química, la
botánica y la historia natural arrojan<i>
luz sobre las artes económicas, sobre el cultivo de los vegetales destinados a
nuestras distintas necesidades, sobre el arte de alimentar, de multiplicar y de
conservar los animales domésticos, de perfeccionar sus razas, de mejorar sus
productos, </i>la anatomía y la química ofrecen orientaciones clara y seguras <i>a la cirugía y la farmacia que se
transforman así en artes casi nuevas</i>. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Un panorama de progreso sin fin, en todos los
ámbitos, se ofrece a la humanidad y en la raíz última de ello se encontraba la
nueva filosofía: <i>(...) </i>(Los) <i>progresos en la política y en la economía
política tenían como primera causa los progresos de la filosofía en general o
de la metafísica, tomando esta palabra en su más amplio sentido.</i></span></div>
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<i><span lang="ES-TRAD" style="font-size: 11pt;">Descartes la había
centrado en el campo de la razón; había comprendido muy bien que debía emanar,
en su totalidad, de las verdades evidentes y elementales que la observación de
las operaciones de nuestro espíritu debía revelarnos. Pero su impaciente
imaginación no tardó en apartarle de aquella ruta que él mismo se había
trazado, y durante algún tiempo pareció que la filosofía no había recobrado su
independencia más que para perderse en nuevos errores.</span></i></div>
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<i><span lang="ES-TRAD" style="font-size: 11pt;">Por último, Locke
encontró el hilo que había de guiarle; demostró que un análisis exacto,
preciso, de las ideas, al reducirlas sucesivamente a ideas más inmediatas en su
origen, o más simples en su composición, era el único medio de no perderse en
aquel caos de nociones incompletas, incoherentes, indeterminadas, que el azar
nos ha ofrecido sin orden, y que nosotros hemos recibido sin reflexión.</span></i></div>
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<i><span lang="ES-TRAD" style="font-size: 11pt;">Demostró, mediante ese mismo análisis, que
todas nuestras ideas son el resultado de las operaciones de nuestra
inteligencia sobre las sensaciones que hemos recibido, o, más exactamente aún,
combinaciones de esas sensaciones que la memoria nos presenta simultáneamente,
pero de manera que la atención se detiene, que la percepción se limita sólo a
una parte de cada una de esas sensaciones (...)</span></i></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">La aproximación al conocimiento de la realidad ha
cambiado nítidamente; se trata de entender cómo opera la naturaleza en términos
de causas materiales: el mecanicismo sustituye al organicismo y lo desaloja,
sin complejo alguno, del ámbito de la física; incluso, de una forma que se
mostrará prematura y pretenciosa, ensayará esta sustitución en el terreno de lo
vivo, y así, las nociones de <i>hombre
máquina </i>y la pasión por los autómatas<i>
</i>recorrerán el siglo, generando, en sus postrimerías, la reacción romántica:
¡el finalismo que presidía la obra del abate Pluche no podía eliminarse con
tanta facilidad!. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">La ciencia, no obstante, mostraba cada vez con mayor
nitidez su capacidad para transformar el mundo no sólo como fuerza productiva
directa sino como método para entender todos los ámbitos de la vida social. La
cultura quedó impregnada por ella. </span></div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-8734285377851910342011-11-05T18:47:00.000+00:002012-11-05T19:16:04.346+00:00VIERA EN LA CIENCIA DE SU TIEMPO (II)<br />
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<span lang="ES-TRAD" style="font-family: "Book Antiqua"; font-size: 11pt;"> <span style="font-family: Arial,Helvetica,sans-serif;">A fin de situar a Viera en el contexto científico
español, quizás sea conveniente referirse a lo que acabará conociéndose como </span><i style="font-family: Arial,Helvetica,sans-serif;">La polémica de la ciencia española</i><span style="font-family: Arial,Helvetica,sans-serif;">. El
detonante de esta controversia en la que se implicarán autores como Cavanilles,
Denina, Forner, Cañuelo, Iriarte, Samaniego y otros, será un artículo sobre
España de Nicolás Masson de Morvilliers, publicado en la </span><i style="font-family: Arial,Helvetica,sans-serif;">Enciclopedia Methodique</i><span style="font-family: Arial,Helvetica,sans-serif;"> en 1782 en el que acaba preguntándose: </span><i style="font-family: Arial,Helvetica,sans-serif;">Que devons nous à l’Espagne? Qu’a-t-elle
fait pour l’Europe depuis deux siècles? Qu’a-t-elle fait depuis mille ans?</i><span style="font-family: Arial,Helvetica,sans-serif;">. Al margen de lo inevitable que
resultaría, al calor de los argumentos y contra argumentos, el afloramiento de
los sentimientos del orgullo patrio, la distancia entre nuestro país y Europa,
en el plano cultural y científico, que esa requisitoria ponía de manifiesto, ya
había sido percibida y señalada por autores como Feijoo, el mismo Viera, o
tantos otros ilustrados. </span></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">1) El primero no dudará en expresarlo en múltiples
ocasiones en sus escritos y así puede leerse en el Discurso XI del Tomo II de
su <i>Teatro Crítico Universal</i> (cuya
primera parte se publica en 1726) sobre <i>El
peso del aire</i> :<i> (...) Pero porque
esta doctrina aún es peregrina en España, donde la pasión de los naturales por
las antiguas máximas hace más impenetrable este País a los nuevos
descubrimientos en las Ciencias, que toda la aspereza de los Pirineos a las
escuadras enemigas, la explicaré ahora con la mayor claridad que pueda.</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Sobre este tema volverá a incidir, con más detalle,
en sus <i>Cartas eruditas </i>y más en
concreto en la que hace referencia a las <i>Causas
del atraso que se padece en España en orden a las ciencias naturales</i>, que,
por su significación con nuestro ensayo, reproduciremos in extenso:</span></div>
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<li><span lang="ES-TRAD" style="font-size: 11pt;"><i>La primera es el corto alcance de algunos de
nuestros profesores. Hay una especie de ignorante perdurable, precisados a
saber siempre poco, no por otra razón, sino porque piensan que no hay más que
saber que aquello poco que saben (...) Basta nombrar la nueva filosofía, para
conmover a éstos el estómago (...). Y si les preguntan qué dijo Descartes, o
que opiniones nuevas propuso al mundo, no saben ni tienen qué responder, porque
ni aún por mayor tienen noticia de sus máximas, ni aún de alguna de ellas...</i></span></li>
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<li><i><span lang="ES-TRAD" style="font-size: 11pt;">La segunda causa es la
preocupación que reina en España contra toda novedad. Dicen algunos que basta
en las doctrinas el título de nuevas para reprobarlas, porque las novedades en
punto de doctrina son sospechosas...</span></i></li>
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<li><i><span lang="ES-TRAD" style="font-size: 11pt;">La tercera causa es el
errado concepto de que cuanto nos presentan los nuevos filósofos se reduce a
curiosidades inútiles ... Sean norabuena, dicen muchos de los nuestros,
verdaderas algunas máximas de los modernos, pero de nada sirven; y así, ¿para
qué se ha de gastar el calor natural en este estudio?</span></i><span lang="ES-TRAD" style="font-size: 11pt;"><i> Prefieren, pues, dedicarse a algo
más sustancial que la observación empírica o la reflexión sobre fenómenos
concretos y así:</i><i> nosotros, los que
llamamos aristotélicos, nos quebramos las cabezas y hundimos a gritos las aulas
sobre si el arte es unívoco o análogo; si trasciende las diferencias; si la
relación se distingue del fundamento, etc</i></span></li>
</ul>
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<li><i><span lang="ES-TRAD" style="font-size: 11pt;">La cuarta causa es la
diminuta o falsa noción que tienen acá muchos de la filosofía moderna, junto
con la bien o mal fundada preocupación contra Descartes. Ignoran casi
enteramente lo que es la nueva filosofía, y cuanto se comprende bajo este
nombre, juzgan que es parto de Descartes. Como tengan, pues, formada una siniestra
idea de este filósofo, derraman este mal concepto sobre toda la física moderna.</span></i></li>
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<li><i><span style="font-size: 11pt;">La quinta causa es un celo,
pío sí, pero indiscreto y mal fundado; un vano temor de que las doctrinas
nuevas en materia de filosofía traigan algún perjuicio a la religión. (...) Doy
que sea un remedio precautorio contra el error nocivo cerrar la puerta a toda
doctrina nueva. Pero es un remedio, sobre no necesario, muy violento. Es poner
el alma en una durísima esclavitud. Es atar la razón humana con una cadena muy
corta. Es poner en estrecha cárcel a un entendimiento inocente.</span></i></li>
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<li><i><span lang="ES-TRAD" style="font-size: 11pt;">La sexta y última causa
es la emulación, ya personal, ya nacional, ya faccionaria ... Óyeseles reprobar
(la nueva filosofía), o ya como inútil, o ya como peligrosa. No es esto lo que
pasa allí dentro ( en sus corazones). No la desprecian o aborrecen; la
envidian. No les desplace aquella literatura, sino el sujeto que brilla con
ella ... Sería una gran cosa, para tales sujetos, la nueva filosofía si hubiera
nacido en España, y es solo abominable porque la consideran de origen francés
... </span></i></li>
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<span lang="ES-TRAD" style="font-size: 11pt;">Fiel exponente de este modo de ver la ciencia y la
filosofía europea del momento, que denuncia Feijoo, es el publicista Juan Pablo
Forner quien en su <i>Oración apologética
por la España y su mérito literario</i> tercia en la disputa iniciada por el
corresponsal de la <i>Enciclopedie
Methodique </i>en estos términos: <i>(...)
¿Y deberá España sonrojarse por carecer de este linaje de ciencia?</i> – se
pregunta en estilo retórico – <i>Pero ¡oh,
que no poseemos grandes filósofos naturales! ¡Que nuestra lengua y observación
no ostenta aquel portentoso número de volúmenes en que tienen las regiones del
Sena y del Támesis, como en sagrado depósito, descifrados los misterios de la
madre Naturaleza! ¡Que nos vemos forzados a sellar el labio y bajar los ojos
cuando nos echan en cara nuestro descuido en este gallardo ramo de la
filosofía, con tanta utilidad cultivado en toda Europa...!.¿Con tanta utilidad?
No nos deslumbremos (...) La ciencia humana en la mayor parte no es más que una
tienda de apariencias, donde la espléndida exterioridad de los géneros engaña a
la vista y da visos de gran valor a unas materias fútiles en sí y caducas. Este
engaño, que es común en mucha parte de lo que el hombre procura descubrir con
el raciocinio, es como peculiar y casi inevitable en los descubrimientos de la
física. ¿Qué saben todavía los filósofos del íntimo artificio de la Naturaleza,
después de veinticuatro siglos de observaciones?</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Su visión de lo que es capaz de conocer la ciencia
queda clara cuando afirma: <i>(...) En los
seres que componen el mundo visible, jamás alcanzaremos más que lo que en ellos
se pueda numerar y medir. Los principios constitutivos que dan origen a las
acciones de la Naturaleza se esconden obstinadamente en el pozo de Demócrito, y
los razonamientos que se hagan sobre ellos nunca serán sino adivinaciones
agradables, propias para dar pasto de siglo en siglo a la curiosidad humana,
más solícita en conjeturar lo impenetrable que en deducir lo que se facilita al
conocimiento. Redúzcanse a cuerpo las que son realmente verdades en la física,
y vea la vanidad de algunas naciones si tiene motivo justo para desdeñarse del
comercio con la antigüedad, y para tratar de ignorante a España porque no se ha
inclinado a ignorar con ostentación</i>. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">No muestra, como se colige de cuanto sigue, mucho
entusiasmo por el lenguaje en el que se expresa la ciencia moderna y así
cataloga el programa enunciado por Galileo y Newton: <i>(...) No se deje deslumbrar con los ásperos cálculos e intrincadas
demostraciones geométricas, con que, astuto el entendimiento, disimula el
engaño con los disfraces de la verdad. El uso de las matemáticas es la alquimia
de la física, que da apariencia de oro a lo que no lo es.</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Puede así concluir: <i>(...) Pero no por eso cree que su ciencia física pase mucho más allá de
la superficie de las cosas; ni entiende que de las causas físicas puedan
saberse más que las que son efecto de otras causas que negó a la comprensión
del hombre el Dios que le crió, más para que obedeciese sus decretos que para
que escudriñase sus designios.</i> Vanidad de vanidades se conceptuaría aquí
una pretensión como la que animaba la búsqueda de Kepler en el siglo precedente
o la de Linneo en éste: <i>descubrir los
planos con los que Dios diseñó el mundo</i>. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Resignarse al desconocimiento es pues el camino más
sabio:<i> (...) Sin tanto esplendor
ignoramos acá lo que en otros países con gran pompa y aparato: que si en la
ciencia física, como en las demás, no debe contarse por parte científica lo
opinable, lo incierto, lo hipotético, lo que porfiadamente se niega a la
inteligencia, ignorar esto de propósito, o resolverse a no desperdiciar el
vigor del juicio en averiguar cosas que ni se permiten a la comprensión, ni
pueden producir utilidad conocida, no es tanto aborrecer la ciencia como
desestimar sus superfluidades</i>. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">2) Del segundo, de Viera, menos explícito, podemos
entrever lo que piensa por el tono que adopta en los relatos de sus <i>Viajes por España y Portugal</i> o <i>Viajes por Francia y Flandes, Alemania e
Italia</i>, pese a la autocensura que necesariamente se impone.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Es probable que en los viajes que emprende, tomara
en consideración las recomendaciones que en un artículo sobre el <i>Modo en que los viajes sean útiles</i>, su
primo, el también ilustrado José Clavijo y Fajardo, hacía en las páginas de <i>El Pensador</i>: <i>(...) observar el gobierno de los pueblos por donde pasa (...) examinar
con igual cuidado las artes y las ciencias (...) y comparar lo que ha visto
fuera con lo que ha visto en su país (...).</i> </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">En el camino que recorre hasta abandonar España, va
dejando apuntes de lo que ve, siente y padece: <i>(...) descompaginóse el coche, compúsolo en Fuencarral un carretero, y
seguimos por un camino diabólico y terreno de maldición. Todos los lugarejos
por donde pasamos me parecieron infelices, entre ellos los de San Agustín y
Morales, célebre este último por sus aguas sulfúreas. Andadas ya diez leguas
con un día hermoso, llegamos a Cabanillo después de la una, lugar también muy
miserable, y nos apeamos en la casa del cura. (...) Mientras se disponía la
comida me divertí en registrar la biblioteca del expresado cura, la cual se
reducía a Gritos del Purgatorio, Bustamante, Larraga, Flos Sanctorum, de letras
góticas, un añalejo y el rezo de Toledo: todos estos libros sin principios. Por
la tarde anduvimos otras cuatro leguas, pero muy largas, muy intrincadas y de
un horrendo batidero. </i>Más adelante prosigue, refiriéndose a Somosierra: <i>(...) Sobre ser el país triste y miserable,
van las mujeres vestidas uniformemente de una estameña parda, de modo que el
lugar parece un convento de capuchinos</i>. Y de conventos e iglesias, ¡que son
muchos!, aparece jalonado el recorrido por los pueblos y ciudades que atraviesa
la comitiva. Así describe una de estas ciudades: <i>(...) Llegamos a Burgos a las once y media no siendo muy ventajosa la casa
de nuestro alojamiento. Es ciudad grande, de arquitectura gótica y anticuada,
con malas calles, y algunas buenas fuentes. La catedral es de las más bellas de
España. Hay 14 parroquias y muchos conventos de frailes y monjas, con algunos
hospitales</i>; y así uno de aquellos pueblos: <i>(...) Llegamos antes de las 12 a Bribiesca, lugar murado con sus
puertas. Pertenece al Duque de Frías. Hay una pequeña Colegiata, un convento de
monjas clarisas, parroquia antigua, trescientos vecinos, los más descalzos, sin
embargo de haber bastantes zapateros. Las mujeres usan una especie de paletina
o alzacuello de lana negra. Las casas son de facha mezquina, siendo la mejor la
que nos sirvió de alojamiento.</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Ha olvidado aquí todo tipo de pretensiones
literarias, a diferencia de lo que hizo en su anterior <i>Viaje por la Mancha y Andalucía</i> en el que, tomando como guía el
Quijote, se deja envolver por la literatura. Lo que se pierde en adorno, estilo
y quizás agudeza descriptiva se gana en realismo. La España que aquí observa
carece de encanto y poesía: miseria, ignorancia y abandono son el fondo sobre
el que se articula el relato.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">El paso a Francia cambia el tono de las
descripciones: <i>(...) Dos postas y media a
Artix y lo mismo a Pau, a cuya posada, que es buena, llegamos a las 11.- Ésta
es una pequeña ciudad, capital de Bearné situada en una loma sobre el río Gave,
de donde viene el apodo de gavachos que dieron en España a los franceses. Hay
Parlamento, universidad y academia de ciencias y artes. Parece ciudad antigua y
bien poblada, con damas bien peinadas, otras con mantos como capas, otras con
mantillas como un costal doblado en cucurucho, otras las llevan plegadas a la
cabeza, otras lo usan de gaza negra, otras a modo de caleza atada al cuello, y
las más pobres, tocados blancos con caídas de las orejas a los hombros.</i> El
paisaje le parece más benéfico, las referencias a las incomodidades del viaje
desaparecen, la pobreza, a la que hacía continua alusión a su paso por España,
solo recibe unas mínimas notas, pueblos y ciudades trocan su aspecto siniestro
en belleza y en el recuento de edificios y visitas ya no aparecen solo iglesias
y conventos: el espectro se amplía a parlamentos, universidades, academias de
ciencias y bellas artes, hospitales, fábricas de seda o botellas, etc. Así
habla de Dijon: <i>(...) esta ciudad es
grande, bella, antigua, murada y capital de la Borgoña, con catedral,
parlamento, universidad, academia de ciencias, casa de moneda y un castillo a
manera de ciudadela. Su situación es en una agradable llanura, fértil en viñedo
entre los riachuelos Ouchey y Suson. (...) Por la tarde estuvimos en la
Academia de Ciencias, edificio fabricado a propósito y cuyas salas son alegres
aunque pequeñas. La de juntas está adornada con bustos de yeso de los naturales
de la Borgoña, ilustres en Literatura, Bossuet, Vauban, Crebillon, Piron,
Rameau, Saumaise, Buchier, Buffon. (...) En la sala para los experimentos de
física, hay diferentes instrumentos y máquinas, entre ellas una eléctrica con
dos discos de vidrio. Aquí vi por primera vez el modo de extraer el aire fijo e
inflamable con algunos de sus efectos. Nos enseñaron la biblioteca y la
colección de anatomías en pinturas. El gabinete de historia natural, rico en
producciones marinas y petrificaciones. El laboratorio químico con todos los
vasos necesarios. Los académicos de número son 30. Remata este edificio un
pararrayos o elevado conductor eléctrico. </i> <i> </i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">En carta a D. Antonio Capmany, Secretario de la Real
Academia de Historia, fechada el 29 de Agosto de 1777, dos meses después del
inicio del viaje que habrá de llevarlo por tierras de Francia y Flandes, Viera
escribe: <i>Protesto, que no quiero que
huela a elogio la idea que formo de París, ni que parezca ligereza de un nuevo
Abate empolvado la satisfacción que me ocasionan muchas excelentes
circunstancias que voy notando; mas, sin embargo, amigo, es menester confesar,
aunque español sabedor de la historia de Carlos V, que el género humano tiene
aquí el monumento más incontestable de su perfectibilidad, esto es, de los
progresos de su civilización y de su industria, que otros no dudarán en llamar
corrupción, licencia, refinamiento, lujo y vida sensual. ¡Cuanto celebraría yo
que fuese Vd. testigo de esta sensualidad del gusto, de esta corrupción de las
ciencias, de este lujo de todas las artes, y de este refinamiento de la
sociedad, para condenarla después en medio de Castilla la Vieja, en cuyos
lugares, como solemos decir en nuestra Academia, hay siete y medio vecinos, un
zapatero de viejo, veinte pobres de solemnidad, cuatro reses vacunas, etc.</i>
El tono de la misiva no ofrece dudas, Viera aparece encandilado por un país, y
más en concreto, por una ciudad, París, en la que lleva instalado solo desde el
13 de ese mes de Agosto, pero de la que ya ha podido apreciar parte de su
brillo. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Su estancia en la capital de Francia tiene dos
épocas bien diferenciadas en las que la actividad del abate es claramente
distinta: la primera se extiende desde su llegada, el 13 de agosto, hasta el
regreso de una breve expedición a Flandes el 7 de Noviembre de 1777, y la
segunda comienza el 17 de ese mes, con la apertura del curso de Sigaud de la
Fond sobre aires fijos, hasta el 21 de Julio de 1778 en que abandona la ciudad.
Durante el primer periodo las visitas culturales o de cortesía a cortesanos o
personajes españoles desplazados a Francia o Flandes son el núcleo central de
su actividad y de la de sus mentores, en tanto que en el segundo, su atención
se centra en la asistencia a los cursos de física, química e historia natural,
la visita a los gabinetes científicos, a las academias, museos, reuniones
literarias y científicas, etc.<i> </i>De
todas estas experiencias se nutrirá su producción posterior, y más en concreto
sus obras científicas.</span></div>
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<b><span lang="ES-TRAD" style="font-size: 11pt;">Cursos y
Gabinetes de demostración y divulgación científica</span></b></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">La pasión por la ciencia, o con más
exactitud por <i>las maravillas de la
ciencia</i>, tiene su expresión más acabada en el interés que todas las
noticias sobre ella suscitan entre el público instruido que acude a los
distintos salones: la política, la literatura o la conversación galante dejan
hueco a la historia natural, la química, la física o la astronomía. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Al amparo de este interés se ofrecen
cursos específicos – al estilo de los que Viera siguió en París o de los que
más tarde dirigió él mismo en Madrid y Canarias – o se montan gabinetes de
química, electricidad, historia natural, etc., desde los que se oficia como
sacerdotes de una nueva religión: la ciencia. Viera describe los tres a los que
asistió como alumno y así se expresa sobre uno de ellos, el de Historia natural
de Mr. Valmont de Bomare: <i>(...) Su
gabinete, aunque corto, comprende dos salas bastante claras y enriquecidas de
las producciones de los tres reinos. El concurso de damas, caballeros y
curiosos de todas clases, fue muy numeroso y lucido. Mr. Bomare pronunció un
discurso harto elocuente que dividió en tres puntos, recomendando el ameno
estudio de la naturaleza, sus utilidades y placeres, haciendo una bella
descripción del actual estado de nuestro globo, sus ruinas, sus vicisitudes,
sus fenómenos, y las causas, y hablando de los autores que han tratado mejor
esta ciencia, desde Aristóteles hasta el célebre Buffon, de quien hizo un
elogio breve, pero expresivo. En suma: el aparato del gabinete, el concurso, la
larga mesa que se veía en el centro cubierta con muestras de las producciones
más esquisitas de la Historia natural; el orador a la cabeza del concurso, ya
sentado y ya de pie en una especie de nicho que hacía la pared de la sala; y
sobre todo lo patético de su sermón, todo infundía no sé qué género de
entusiasmo o idea religiosa y sublime de la naturaleza, que se miraba allí con
templo, culto, panegirista, fieles, etc. </i> </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">La negra visión que tenía al abandonar España se
verá reforzada a su regreso del viaje europeo, y así escribe, en misiva del 19
de julio de 1781 al Conde de Aguilar, embajador español en la corte vienesa: <i>(...) Pero esta buena idea que los Vizcaínos
pudieran dar de nuestra España la echó luego a perder el paso por Castilla la
Vieja, la chocha, la decrépita, puesto que no veíamos sino lugares dispersos,
ya casi demolidos, hombres y mujeres con figuras de espectros, todos negros,
puercos y cubiertos de andrajos.</i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Su actividad en la corte madrileña así como las
posibilidades de contraste y comparación que le ofrecen sus viajes no han hecho
otra cosa que acentuar las ideas y el talante que ya apuntaba desde su periodo
lagunero: el pesimismo aparece, como en tantos otros ilustrados del momento,
inextricablemente confundido con el espíritu regeneracionista. Así, ya en las
requisitorias dadas a la luz en el <i>Memorial
del Síndico Personero</i>, en 1764, se expresaba en estos términos sobre la
sociedad tinerfeña: <i>(...) yo no tengo
miedo de decir que si Tenerife conoció en algún tiempo el dichoso encanto de
amor a la Patria, ya no lo conoce. La falsa
comodidad, la indolencia, los intereses particulares, la incivilidad, la
ignorancia, la superstición, la vida oscura y el salir cada uno del día por
donde puede son las partes que hacen el principal carácter del grueso de
nuestros compatriotas</i> añadiendo, después de hacer una encendida defensa de
lo público que él considera abandonado: <i>(...)
Este amor público, este dulce tirano que en todas las repúblicas formó siempre
aquella raza de hombres heroicos, consagrados enteramente a hacer felices a sus
patrias y a serlo ellos mismos no es ciertamente nuestra virtud. Esta ha
perdido entre nosotros casi toda la magia de su noble imperio (...) ¿Es posible
que los intereses y las miras particulares han de llenar siempre de un funesto
herrumbre los resortes de la única máquina que puede ser el instrumento de la
común felicidad? ¿Es posible que la causa pública no ha de tener nunca sus
héroes?. Las grandes virtudes en las grandes Repúblicas fueron únicamente las
que se dirigieron a hacer dichosos a los ciudadanos, y sólo así se pueden
formar los que tienen derecho a ser reputados por grandes hombres. </i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Como remedio no duda en proponer un programa de
educación para niños y jóvenes que considera imprescindible: <i>(...) La educación de la juventud es
lastimosa; y no sería tiempo perdido el que V.S. emplease en ver como se le
puede dar una forma más regular y más decente. La República pide ciudadanos que
sean su adorno y sus delicias y la infeliz educación se los niega. A V.S.
pertenece remediar del modo posible esta desgracia, que es la ponzoñosa raíz de
todas las desgracias de un pueblo. A V.S. pertenece discurrir el modo de que se
erijan algunos seminarios para la educación de los jóvenes de ambos sexos. A
V.S. pertenece animar el celo de sus maestros y buenos padres que se aplicasen
seriamente a formarles el juicio y rectificarles el corazón (...) </i>y al que
desciende, con mayor detalle: <i>(...) Sobre
todo, Señor, las letras y las artes útiles y agradables me parecen un objeto
digno de la atención y de la grandeza de V.S. Tenerife por este lado hace una
figura muy pobre y muy deslucida en el Gran Teatro del Mundo. Las ciencias, las
amables ciencias, que en Europa han elevado el presente Siglo, sobre todos los
siglos más ilustrados de la Antigüedad griega y romana, aún para las Islas
Afortunadas son extranjeros. V.S. es el Cabildo de un País que todavía vive en
los funestos siglos X y XI pudiendo no serlo</i>. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">La escuela, como no podía ser de otro modo, aparece
como un elemento de transformación, siendo al mismo tiempo un oasis de resistencia:
<i>(...) Para conocer cuánto puede influir
una buena crianza en la verdadera gloria de un pueblo no es necesaria mucha
penetración; pues es bastante considerar la diferencia portentosa que ella
pone, no solo entre algunos particulares, sino entre provincias y naciones
enteras. Ella las eleva o las abate ¡Qué infinita diversidad no pone la cultura
entre dos terrenos por otra parte semejantes! (...) Pero si se deja que a los
errores de la ignorancia, en que naturalmente nacen nuestros jóvenes, añada sus
falsas preocupaciones la mala educación, ¿qué nombre respetable adquirirán
ellos, ni la Patria en el mundo? El estudio, Señor, es quien corrige los unos y
disipa los otros (...) Pero para dar este paso es necesario tener mucha
satisfacción del genio y de la suficiencia del maestro; porque, Señor, si el
funesto talento de inspirar ideas falsas de las cosas, es el talento favorito
de nuestros padres, de nuestros amigos, de nuestros criados y de cuantas
personas asedian sin cesar a nuestra voluntad miserable, ¿no sería una
verdadera desgracia que nuestros mismos maestros se aliasen con ellos para
acabar de estragar autoritariamente nuestros espíritus</i> (en estas
consideraciones de Viera y en particular las que se refieren a las opiniones
del vulgo podemos, por un lado, reconocer el eco de las reflexiones de Feijoo y
por otro, una de las ideas guía del Despotismo Ilustrado – ¿cómo contar, para
producir un cambio profundo en la sociedad española, con un pueblo que se
encuentra sumido en la ignorancia, el error y la superstición?– ). </span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjauAOy3hQTqQXOy4Br3Yzt-Qt2EfwKMpP9rUcGLqA2D-VTloNhIZmvFNAOhMovnITVfkCi7FeyiOZ6gLikBDt63nA3SuE_PgiUrCYpG9lE8Ox4jpQ4-D78Mcd7y5uJbV-b7Fvq3lUqeKY/s1600/arcoiris.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="245" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjauAOy3hQTqQXOy4Br3Yzt-Qt2EfwKMpP9rUcGLqA2D-VTloNhIZmvFNAOhMovnITVfkCi7FeyiOZ6gLikBDt63nA3SuE_PgiUrCYpG9lE8Ox4jpQ4-D78Mcd7y5uJbV-b7Fvq3lUqeKY/s320/arcoiris.jpg" width="320" /></a><span lang="ES-TRAD" style="font-size: 11pt;"> </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">A los
maestro les recomienda como textos de formación <i>El Catecismo histórico </i>de Fleury, el <i>Espectáculo de la Naturaleza </i>del abate Pluche, y el <i>Teatro Crítico Universal</i> de Feijoo,
título, este último, del que él mismo, como otros muchos ilustrados españoles,
ha bebido<i>.</i> Resulta interesante
señalar que el tono de las dos obras en las que se trata de ciencia – el <i>Teatro </i>y el <i>Espectáculo de la Naturaleza</i> – es radicalmente distinto: el
mecanicismo con que se abordan cuestiones físicas y químicas en el primero,
contrasta con el finalismo que impregna la aproximación a las ciencias de la
naturaleza del segundo, en el que pueden leerse afirmaciones como las que
siguen: <i>(...) Dios ha hecho salado el mar
porque si hubiera carecido de sal hubiera sido perjudicial para nosotros...,
las mareas fueron creadas para que los barcos pudieran entrar en los puertos
con mayor facilidad ... el rojo o el blanco hubieran cansado la vista, el negro
la hubiera entristecido, el verde se da en la naturaleza para ayudar a la vista
y los diversos tonos de verde sirven para alegrarla.</i> Parece evidente que,
en la más ortodoxa tradición bíblica, el destinatario último de la cadena de
finalidades no es otro que el hombre. Pese a que la obra que glosamos, <i>El Síndico Personero</i>, pertenezca a la
primera época de Viera, la disparidad de enfoque con el que se abordan las
cuestiones físicas y las biológicas es fiel reflejo de lo arduo que resultó
asaltar, desde el mecanicismo, el ámbito de lo orgánico. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Las recomendaciones de Viera en el <i>Síndico Personero </i>exigen, siquiera sea
de una forma concisa, incluir unos breves apuntes sobre la situación canaria
durante la época. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Canarias en el
siglo XVIII es una sociedad que, dependiente del exterior y más en concreto de
Inglaterra, aparece estrechamente vinculada, desde todos los puntos de vista,
al extranjero. La expansión económica del siglo anterior, causada por unos
altos precios del malvasía en el mercado británico que habían consolidado a la
oligarquía local, toca a su fin al desplazarse los intereses comerciales
ingleses a Portugal. El derrumbe de una economía tan dependiente de un solo
mercado es solo cuestión de tiempo y la decadencia se instala a lo largo del
siglo XVIII en las Islas; con ella cambian las prioridades del sector dominante
que se ve obligado a recortar gastos y a cuestionar un estado de cosas que
ahora, a diferencia del siglo anterior, le perjudica. El panorama ya había sido
anticipado por el regidor Fernández Molina cuando afirmaba: <i>es de temer que en breve tiempo se
espiritualicen todas las Canarias y que todos seamos unos meros arrendadores
del clero, de modo que faltando labradores en el campo y artesanos para los
oficios más necesarios, seamos precisados a comprar todo en el extranjero.</i> </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">No es extraño, pues, que ciertas minorías
activas, bien, ligadas al comercio – y por ello necesitadas de una legislación
más libre – bien, a la propia oligarquía agraria o, incluso, a sectores del
clero secular en conflicto con las poderosas órdenes regulares, abogaran por la
introducción de reformas urgentes en sintonía con los aires ilustrados que
soplaban en Europa, y a los que tan permeables eran las Canarias por su
situación como encrucijada de caminos. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Estas reformas, sin embargo, sólo se
quedarían en la superficie porque, en última instancia, la radicalidad de la
propia evolución internacional – de la que la Revolución Francesa es su
exponente más significado –, la insuficiente convicción y capacidad
transformadora de esas minorías críticas, así como sus intereses
contradictorios, acabarían ahogándolas. </span></div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com1tag:blogger.com,1999:blog-723507907050872766.post-69476697576384223442011-11-02T14:27:00.001+00:002012-11-05T19:17:39.621+00:00VIERA Y CLAVIJO EN LA CIENCIA DE SU TIEMPO (I)<div style="font-family: Arial,Helvetica,sans-serif;">
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<span lang="ES-TRAD" style="font-size: 11pt;">Hace años publicamos en la colección <span style="font-variant: small-caps;">materiales de historia de la ciencia</span> tres obras de D. José
de Viera y Clavijo (1731 – 1813) – <i>Noticias
del cielo o astronomía para niños, Los aires fijos </i>y<i> Las bodas de las plantas</i> – en las que aborda temas de Química,
Botánica y Astronomía respectivamente; las dos primeras concebidas por el autor
en forma de poema y la tercera como catecismo –estructura esta última, apoyada
en preguntas y respuestas dirigidas, que también aplicará a sus <i>Noticias de la Tierra o Geografía para niños</i>
y al <i>Librito de la Doctrina Rural, para
que se aficionen los jóvenes al estudio de la Agricultura, </i>entre otras
producciones– .</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">¿Qué nos dicen estas tres obras sobre los
conocimientos científicos de Viera? ¿con qué intención fueron escritas? ¿qué
tienen que ver con el espíritu que animó su tiempo?.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Responder a estos interrogantes exige situar a Viera en su
época, el siglo XVIII, y ello obliga no solo a trazar una breve semblanza
biográfica del personaje sino también a ocuparse, siquiera sea de una forma
necesariamente escueta, del estado de la ciencia del periodo así como del
momento que le tocó vivir.</span></div>
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<span style="font-size: 11pt;">I<b>MPRESIONES
SOBRE LA VIDA Y OBRA</b></span></div>
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<b><span style="font-size: 11pt;">DE
UN CANARIO EN LA ÉPOCA DE LA ILUSTRACIÓN</span></b></div>
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<span style="font-size: 11pt;"> </span><i><span style="font-size: 11pt;"> </span></i></div>
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<i><span style="font-size: 11pt;">En
este estado quedaron las Memorias del señor Viera a su fallecimiento, acaecido
en esta ciudad de Las Palmas de Gran Canaria en la madrugada del 21 de Febrero
de 1813.</span></i></div>
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<span style="font-size: 11pt;">Erigiósele un tosco
túmulo de piedra y cal en el cementerio católico de dicha ciudad, a un metro y
tres decímetros del muro del norte, y como a ocho metros y medio de distancia
del muro del poniente, permaneciendo en él sus restos hasta el 19 de Diciembre
de 1860, en que se derribó para hacer la traslación de los mismos,
provisionalmente, a uno de los nichos del nuevo panteón de los canónigos,
construido en el mismo cementerio, y una lápida marca el sitio donde descansan
las cenizas de este Ilustre Canario, hasta que con el tiempo se levante un
sepulcro consagrado exclusivamente a perpetuar su memoria.</span></div>
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<span style="font-size: 11pt;">Al hacerse la exhumación,
se hallaron aquellos restos casi todos deshechos, a excepción de la parte
superior del cráneo, las canillas, y los huesos largos de los brazos,
encontrándose entre la cal que los cubría, dos hebillas de acero, una de las
cuales estaba rota.</span></div>
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<span style="font-size: 11pt; font-style: normal;">¿Quien
es este señor Viera? ¿Quien fue ese Ilustre Canario? ¿A quien pertenecieron
esos despojos? ¿Qué nos dicen sus Memorias? ¿Revelan una personalidad eminente?
¿Se trata de una figura clave dentro de un proceso renovador? ¿Qué ideas
albergó ese cráneo cuya parte superior resistiera, con verdadero afán de
perduración, el paso destructor del tiempo? ¿Esas hebillas de acero, de qué
época hablan, de qué clase social? ¿Esas cenizas merecían tan alto honor?.</span></div>
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<span style="font-size: 11pt; font-style: normal;">Detengámonos
un momento y contemplemos su grabado. Una noble fisonomía envuelta en ropaje de
abate. Una mirada, una sonrisa que son de un siglo de luces, no de tinieblas.
Una frente poderosa que parece contener ideas poderosas. Una imagen que nos
transporta en el tiempo a un periodo de nuestra civilización que amamos. A un
siglo que brilla en nuestro conocimiento con luz especial: la luz de la
Ilustración. Un siglo de revolución, de transformación, de cambio y progreso.
Un siglo forjador de una nueva mente para un hombre nuevo: el Hombre Moderno,
amante de las ciencias, la duda, incrédulo y hostil a la superchería.</span></div>
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<span style="font-size: 11pt; font-style: normal;">¿Fue
José de Viera y Clavijo, ese </span><span style="font-size: 11pt;">Arcediano que tenía la sonrisa de Voltaire,</span><span style="font-size: 11pt; font-style: normal;"> – pues no es otro ese </span><span style="font-size: 11pt;">señor Viera</span><span style="font-size: 11pt; font-style: normal;">, ese </span><span style="font-size: 11pt;">Ilustre Canario</span><span style="font-size: 11pt; font-style: normal;"> que tan bien dejara grabado, para la posteridad, P.
Hortigosa – un Hombre Ilustrado? ¿Responde este cura de provincias, educado por
los dominicos, mas tarde reeducado por el P. Feijoo, conocedor de Voltaire,
admirador del P. Isla, miembro de la tertulia lagunera de Nava, poeta,
traductor, autor de una historia de su tierra canaria, viajero en la Europa del
siglo XVIII por cuenta de la nobleza junto a la que medró, visitador incansable
de Jardines de Botánica, gabinetes de Historia Natural y Física, asistente
asiduo a conferencias académicas, químico, divulgador, etc., a la idea de
enciclopedismo, poligrafismo y cientifismo que caracteriza a una época
conflictiva, beligerante, que ha plantado batalla en todos los frentes: en el
campo de la economía, de la política, de la religión, de lo social, de las
ideas? ¿Contribuyó este hombre, que consagrara su vida a la Iglesia, a imponer con
su obra, en la España de los Borbones, esa nueva concepción de las cosas
terrenales y divinas que se abría paso, a golpe de sable, allende la frontera?.
En resumen, ¿fue José de Viera y Clavijo un espíritu moderno?.</span></div>
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<span style="font-size: 11pt; font-style: normal;">Dejemos
que sea él mismo quien despeje tanto interrogante. Que su obra, de una vida
entera, nos descubra su verdad. Articulemos esos huesos deshechos,
recubrámoslos de músculos y nervios, hagamos correr la sangre por sus venas,
inyectémosle vida e interroguémosle. Busquemos la respuesta en cada acto de su
vida, en su palabra escrita, en su acercamiento a la naturaleza, en su visión
de un mundo que se resquebraja y su esperanza en otro que va imponiéndose con
tenacidad e ira.</span></div>
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<span style="font-size: 11pt; font-style: normal;">Viera
nació, vivió y murió bajo el cetro de los Borbones, en un siglo y una tierra
donde llegó a señorear el despotismo ilustrado. Vio su primera luz un día de
diciembre del Año de Gracia de 1731, en un trozo de tierra canaria (Realejo
Alto) con Felipe V, monarca absolutista; transcurrió su juventud bajo el manto
pacifista de Fernando VI; Carlos III arroparía con su espíritu ilustrado una
madurez fecunda; su vejez fue testigo de la caída y muerte de un rey abúlico:
Carlos IV. Floridablanca, Aranda, Campomanes, Jovellanos favorecerían su
incuestionable elección a favor del progreso y las luces y en contra de la
decadencia y el oscurantismo.</span></div>
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<b><span style="color: red; font-size: 11pt;"></span></b><span lang="ES-TRAD" style="font-size: 11pt;">Su aparición se produce en una época de
verdadera explosión demográfica: cinco millones de almas más disputándose un
lugar en una tierra que parecía despertar de un ocaso de Imperio. Procedente
del estado llano, de su sector más culto – su padre era miembro de esa
burguesía ascendente que no tardaría mucho en ser dominante, y de profesión
escribano – fue protegido por el clero y la nobleza: los dos máximos estamentos
en la sociedad española del siglo XVIII. Ayo del Marquesito del Viso y gran
amigo de su padre, el Marqués de Santa Cruz, recorrería una Europa fascinante,
en plena ebullición intelectual que le dejaría una espléndida huella en su
noble rostro: esa sonrisa que tanto agradaría a Un Voltaire y que, con toda
seguridad, se vería en más de una ocasión a borrar por entero de su faz.
Reclutado por la Iglesia, ésta llegaría a premiarlo con un arcedianato: el de
Fuerteventura.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;"> En la
España del XVIII el noble nace, el clérigo se hace. Mientras el privilegio
nacía con el primero, el segundo lo adquiría con el estudio, el tesón y el
mecenazgo. Ser miembro de una institución como la eclesial, que casi era <i>un estado dentro del estado</i>, comportaba,
pues, todo un privilegio. El <i>color de la
sangre</i> era requisito ineludible para acceder a un alto cargo, obstáculo que
no lograría salvar el estado llano, salvo honrosas excepciones. Buen número de
sacerdotes se veían obligados a ejercer trabajos que nada o muy poco tenían que
ver con su profesión. Es así que vemos a muchos de ellos <i>administrar patrimonios de señores particulares, y ocupados como
preceptores de gramática</i>. La Iglesia española era, en el siglo de la
Ilustración, un estamento privilegiado, con fuertes raíces en el pasado,
que obtenía sus ingresos a través de
primicias, diezmos y donaciones o de los beneficios que le reportaban sus
extensas propiedades (tierra, ganado, etc.) y servida por ese Cancerbero de
temibles colmillos que se llamó Inquisición, especie de organización
paraeclesial que, aunque con poderes recortados en la segunda mitad del siglo, <i>allí donde sus fauces hundía, el desgarro y
la amargura proporcionaba</i>.</span></div>
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<span style="font-size: 11pt; font-style: normal;">Gran
lector, quemó sus ojos, ya desde la infancia, en todo tipo de lectura: </span><span style="font-size: 11pt;">(...)
y no había clase de libros, fuesen devotos o profanos, de historias o novelas,
de instrucción o diversión, en prosa o en verso, en octavo o en folio</span><span style="font-size: 11pt; font-style: normal;">, que se resistiera a su insaciable curiosidad.</span></div>
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<span style="font-size: 11pt; font-style: normal;">La
escolástica y el aristotelismo no consiguen dañarle su extraordinario cerebro,
y es el P. Feijoo quien barrería con esos </span><span style="font-size: 11pt;">miserables estudios</span><span style="font-size: 11pt; font-style: normal;"> que tan sabiamente impartían los dominicos en el convento
de Santo Domingo de la Orotava.</span></div>
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<span style="font-size: 11pt;">Benito Jerónimo Feijoo,
benedictino, encontraría en Viera un campo perfectamente abonado donde
depositar su semilla sin temor a que ésta no germinara. Su <i>batallar por la verdad y purgar al pueblo de su error</i> quedaría
grabado, con toda seguridad, en la conciencia de este nuevo y desconocido
discípulo, y su obra crítica sería devorada con impaciencia, por un espíritu
ansioso de un <i>nuevo mundo científico
(...) y otros inmensos horizontes</i>.</span></div>
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<span style="font-size: 11pt;">Esta influencia, junto a la
recibida de sus traducciones del francés, inglés e italiano le proporcionarían
las herramientas adecuadas con las que fustigar, desde el púlpito, la
ignorancia y supercherías tan comunes entonces y elevar a la categoría de
digna, una oratoria dominada por la falacia y la necedad.</span></div>
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<span style="font-size: 11pt;">Su escalada hacia las cimas
del pensamiento ilustrado europeo es irrefrenable. La atracción que ejerce en
él la sonrisa de Voltaire se haría más poderosa con su entrada, como miembro
distinguido, en la tertulia lagunera de Nava, especie de tabernáculo de las más
avanzadas ideas de la época, auténtico oasis de la Ilustración en un panorama
cultural desolador y esclerotizado. Integraban la misma <i>distintos caballeros principales de Tenerife, que amantes de la buena
instrucción, y unidos por los vínculos de la amistad, procuraban acercarse a
los conocimientos de la Europa sabia, y burlarse de ciertas preocupaciones del
país</i>. Don Tomás de Nava y Grimón, marqués de Villanueva del Prado; Don
Cristóbal del Hoyo, marqués del Buen Paso; Don Juan Bautista de Franchy; Don
Fernando de la Guerra y Peña; Don Juan A. de Franchy y Ponte: Don Martín de
Salazar, conde del Valle Salazar; Don Juan Urtusaustegui; Don Agustín de
Bethencourt y Castro, etc., la mayor parte de ellos miembros del estamento
nobiliario, clase social dominante y con poder político-social real. Élite
privilegiada, propietarios de la tierra, ocupaban – capa media de la nobleza –
los altos cargos del ejército, la iglesia y la administración. Acceder a la
hidalguía, fuente de privilegios jurídicos y económicos, en la España de los
Borbones, no sería fácil, llegándose incluso a dictar leyes restrictivas a tal efecto. La Corte fue centro de atracción
para la alta nobleza y sus intereses eran los mismos que los de su Rey. En lo
esencial, la Ilustración no llegaría a cuestionar sus prerrogativas.</span></div>
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<span style="font-size: 11pt;">La relación de Viera con la
célebre tertulia fue de participación activa y creativa. Fruto de la misma
serían aquellos <i>papelillos críticos</i>
que recogería la Gaceta de Daute; la <i>vagatela
(sic) de los Endecasílabos en elogio fúnebre del Marqués de San Andrés</i>, el
más volteriano de los miembros de la tertulia; su <i>Representación en nombre del Síndico Personero de la Orotava al
Comandante General y a la Real Audiencia sobre la facilidad y grandes ventajas
en la apertura de un puerto con un muelle en la playa de Martianes, conforme a
lo dispuesto por sus diputados en cabildo general del 18 de Mayo de 1769; Carta
filosófica sobre la aurora boreal que se observó en la ciudad de La Laguna la
noche del 18 de Enero de 1770; Observación del paso de Venus sobre el disco
solar del día 3 de Junio de 1769, desde una azotea del Puerto de Orotava, por
medio de tres telescopios de reflexión.</i></span></div>
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<span style="font-size: 11pt;">Pequeñas y grandes ideas llegaron
a cocerse en esta insólita tertulia de intelectuales ilustrados, libres de
trabas inquisitoriales o con mayores disponibilidades de burlarlas. Estar al
corriente de los últimos avances de las ciencias y las letras sólo le era
factible a determinada minoría. Y ésta utilizaba todos los medios a su alcance
para poder satisfacer su curiosidad de ilustrados: desde la lectura de libros
en su idioma original, a la proyección de viajes al extranjero, pasando por la
correspondencia o las visitas de hombres notorios que con sus conocimientos y
trabajos estaban contribuyendo a cambiar el mundo. La prohibición de la <i>Enciclopedia</i> –ese gran testamento del
siglo de las luces– no fue óbice para que ésta fuera devorada por los
ilustrados españoles en general y canarios en particular. </span></div>
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<i><span style="font-size: 11pt;">La embarcación aportó a aquella ciudad, el día 21 de
noviembre de 1770. Allí observó Viera todo lo más notable, y siguió las
jornadas regulares a Madrid.</span></i><span style="font-size: 11pt;">
¿Qué hacía nuestro ilustrado abate en tierras continentales? ¿Qué
preocupaciones le llevaron a abandonar su isla lejana y trasladar su inquieta
figura a la Corte del más ilustrado de los Borbones, Carlos III?. </span></div>
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<span style="font-size: 11pt;">Echemos un vistazo hacia
atrás, remontémonos en el tiempo y contemplemos a un Viera afanado en
investigar, husmear documentos, escarbar en manuscritos, acumular datos ¿Qué
idea anidó en su cerebro que tan revuelto lo tiene? Acerquémonos quedamente.
Juan de Bethencourt el Grande, Juan Núñez de la Peña, Antonio de Viana, F.
Alonso de Espinosa, Fray Juan Abreu Galindo. No cabe duda. Es su obra maestra
la que bulle en su magistral cabeza: <i>Noticias
de la Historia General de las Islas Canarias</i>. ¿Qué le impulsaba a emprender
una obra de tal envergadura? Veamos lo que él mismo nos dice: <i>Había algún tiempo que le causaba
desconsuelo el ver que carecía su patria de una exacta, juiciosa y digna
historia... Deseaba, pues, hacer a las Canarias este servicio.</i></span></div>
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<span style="font-size: 11pt;">¡Qué gran deuda para con sus
amigos de la Tertulia! Pues no otros eran los que financiaban un viaje que
sería decisiva en la vida de este cura de provincias recién convertido en
historiador de una tierra que le diera savia y raíces. Terminado el primer tomo
y a punto de dar remate al segundo fue necesaria su presencia en Madrid. Y es
así que le vemos camino de la Villa y Corte, con su voluminosa historia
soberbiamente impresionada en cada partícula de su ser.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Sus días de viajero no habían hecho sino
empezar.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">A partir de este momento y bajo el mecenazgo
del Señor Marqués de Santa Cruz, Grande de España, de cuyo hijo era tutor,
Viera entraría en contacto directo con el mundo de la Ilustración y con muchos
de sus héroes, visitando Francia, Flandes, Alemania, Italia y Austria.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Por su <i>Diario
e itinerario de mi viaje a Francia y a Flandes (1777 – 1978) </i>conocemos los
lugares hacia donde su infatigable inquietud lo arrastrara. No quedó ciudad,
iglesia, palacio, academia, biblioteca, museo, gabinete de historia natural, de
física, jardín botánico, laboratorio químico que no supiera de su inquisitiva
presencia. París, sede del movimiento cultural ilustrado, le daría la magnífica
ocasión de <i>tratar a los sabios y artistas
de más nota</i>. Sus pasos resonaron en los pasillos de las academias de
ciencias, artes y medicina; Sigaud de la Fond, Balthazar Sage y Valmont de
Bomare lo tuvieron como alumno diligente en sus cursos de física experimental,
química e historia natural. <i>Des nouvelles
de la republique des Lettres et des Arts </i>hizo de él uno de sus primeros
suscriptores. Benjamin Franklin, político, científico y publicista americano;
Condorcet, secretario de la Academia de Ciencias; D’Alembert, matemático,
físico y escritor; Barthelemy, etc., fueron algunos de los muchos hombres de
ciencias y letras con los que nuestro clérigo llegaría a trabar conocimiento en
esos famosos miércoles de la <i>posada de la
Blancherie</i>.</span></div>
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<span style="font-size: 11pt;">Un
segundo periplo lo llevaría a través de Italia y Alemania. Sus aventuras
quedarían registradas en su <i>Diario e
itinerario de viaje desde Madrid a Italia y Alemania, volviendo por los Países
Bajos y por Francia</i> <i>(1780 – 1781)</i>.
De nuevo su insaciable curiosidad cultural lo encaminaría hacia todo aquello
que le procurara satisfacción y conocimiento intelectual. Se entretuvo en el
gabinete del padre Beccaria, quien en su honor, hizo verdaderos alardes de su
sabiduría en cuestiones de electricidad, <i>en
lo que era tan famoso</i>. Sería agasajado en la corte romana en la que obtuvo
del <i>docto padre Mamachi, Ministro del
Sacro Palacio (...) licencia absoluta para leer libros prohibidos en los
dominios de España y Portugal, sin excepción ninguna de obras ni de materias</i>.
Nápoles lo introduciría en un mundo de magia – <i>la Grota d’il Cane, en la cual hizo el común experimento de hacer caer
como muerto a un perro con el gas mefítico que allí se exhala, y volverlo a
resucitar al punto, aplicándole el álcali volátil</i> – y de viejas ruinas
históricas – <i>las excavaciones de
Herculano y Pompeya</i> –. En Florencia, el Gran Galileo, desde su tumba, le
recordaría, con toda certeza, la persecución de que fuera objeto la ciencia en
su propia persona, el dolor y la pesadumbre infligidos por una intransigencia
religiosa sin límites, que veía como se tambaleaban unos conceptos que les
servían de base para sostener un Universo en el que <i>ellos, más que el mismo Sol brillaban</i>. <i>El telescopio, la esfera copernicana, los satélites de Júpiter, la
caída de los cuerpos graves</i>, ¿podemos imaginarnos qué sentimientos lo
embargarían ante estos símbolos que contribuyeron a crear la nueva era, <i>disipando errores</i>, y despejando un
camino enmarañado por intereses de dominación más terrenales que divinos?.</span></div>
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<span style="font-size: 11pt;">En
Viena conocería al <i>naturalista, químico y
director del Jardín Botánico Imperial Nicolaus Joseph Jacquin, quien tuvo el
gusto de sorprender a Viera el día en que le mostraron las plantas, llevándole
a un invernáculo en el cual se criaban muchas de las peculiares de las
Canarias, como son: el plátano, ñame, yerba de risco, cardón, retama blanca,
verode</i>; al <i>Doctor Jan Ingenhousz,
médico del Emperador, autor de los nuevos descubrimientos de los gases, o aires
fijos, que exhalan las plantas, en cuyo estudio divirtió a los Señores con
varios experimentos muy distintos, distintas noches</i>. Dos experiencias que
dejarían honda huella en un hombre cuyo amor a las ciencias le había llevado a
reservarles en su genial cerebro
fantásticas parcelas.</span></div>
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<span style="font-size: 11pt;">Un
año, tres meses y cinco días de auténtico vértigo cultural, en los que el
agasajo frívolo alternó con el gozo intelectual. En los que la nobleza, la
iglesia y la cultura rindieron un valioso homenaje a este amante de las
ciencias y las artes, facilitándole, en todo momento, el libre movimiento en
una galaxia muy distante a la de su procedencia. ¡Qué gran deuda para con su
noble amigo el Marqués de Santa Cruz! ¡Qué gran deuda para consigo mismo, para
con ese cerebro privilegiado, a quien la naturaleza, como las hadas madrinas de
los viejos cuentos infantiles, donara extraordinarios dones: talento,
inteligencia, lucidez, una viva curiosidad, una avidez de conocimientos sin
igual, una extremada sensibilidad, un amor inusitado a la ciencia, una sonrisa,
en fin, réplica magnífica de aquella otra que lo fuera del más grande de los
hombres de la Ilustración: Voltaire!.</span></div>
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<span style="font-size: 11pt;">Su
vuelta a Canarias se produce cuando nuestro insigne Arcediano cuenta cincuenta
y tres años de edad. Esta nueva etapa de su vida sería la de su colaboración
con la Real Sociedad de Amigos del País de Gran Canaria, quien le nombraría su
Director el año 1790, y la de la gestación del <i>Diccionario de Historia Natural de las Canarias, o índice alfabético de
los tres reinos, animal, vegetal y mineral con las correspondencias latinas</i>.</span></div>
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<span style="font-size: 11pt;">Curiosísimas
son las memorias destinadas a la Real Sociedad de Amigos de Canaria: <i>Examen analítico de la fuente agria de Telde,
sita en el barranco del Valle de Casares; el de la fuente llamada de Morales, a
súplica del corregidor D. Vicente Cano; Noticias sobre las minas de carbón de
piedra, su naturaleza,</i></span><i><span style="font-size: 11pt;">&</span></i><i><span style="font-size: 11pt;">; Sobre el ricino o palmacristi, o higuera
infernal, llamada vulgarmente tártago en estas islas, sus utilidades
económicas, sus virtudes medicinales,</span></i><i><span style="font-size: 11pt;">&</span></i><i><span style="font-size: 11pt;">; Sobre el azaigo, tasagayo o raspilla que
es la rubia silvestre, para el tinte rojo de lana, su cultivo, </span></i><i><span style="font-size: 11pt;">&</span></i><i><span style="font-size: 11pt;">; Sobre el modo de hacer el cremor tártaro y
el cristal de tártaro de las rasuras de las pipas y los toneles de vino; Sobre
algunas observaciones relativas a la cría de gusanos de seda; Sobre el modo de
quemar el cófe-cófe yerba barrilla, para hacer la sosa o sal alcalina; Sobre el
modo como se hace en Francia el carbón de leña; Sobre el modo de renovar pasta
de yerba de orchilla, y su uso en los tintes; Sobre el modo de renovar los
sombreros viejos; Sobre el modo de desengrasar la lana; Sobre varios secretos
para el uso de plateros y orífices, y dar distintos colores al oro, </span></i><i><span style="font-size: 11pt;">&</span></i><i><span style="font-size: 11pt;">; Sobre el origen, naturaleza, cultivo y
usos económicos de las papas; Sobre el modo de hacer pan de papas; Sobre el
modo de regenerar la buena semilla de las papas; Sobre el mejor uso que pudiera
hacerse de la pita o ágave americano; Sobre algunas utilidades de la ortiga
picante; Sobre el modo de hacer queso de leche de vaca a la holandesa; Sobre el
modo de pulimentar el mármol, </span></i><i><span style="font-size: 11pt;">&</span></i><i><span style="font-size: 11pt;">. </span></i></div>
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<span style="font-size: 11pt;">Sus
fines, como vemos, son de carácter utilitario, práctico. He aquí una faceta que
nos muestra a un Viera preocupado por los asuntos comunes, triviales en
apariencia, ligado a las <i>cosas de la
tierra</i>, empeñado en la instrucción y el didactismo.</span></div>
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<span style="font-size: 11pt;">Su
afición a la naturaleza lo llevaría en la última década del siglo, en plena
Revolución Francesa, a impartir clases de historia natural, <i>en su casa,..., en dos sesiones por
semana,... se recorrieron los tres reinos de la naturaleza, y se hicieron
varios experimentos sobre los gases o aires fijos, con otras curiosidades
químicas</i>. En su mente – ¿cómo dudarlo? – se hallaban bien grabadas las
innumerables visitas que hiciera, viajero por la Europa de la Ilustración, a un
sinfín de museos de historia natural. La huella dejada se abrió, entonces, como
un fruto: el embrión de un gabinete de Historia Natural en su patria chica.</span></div>
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<span style="font-size: 11pt;">¿Fue
Viera un Hombre de su Siglo? ¿Su trayectoria, lo proyectó para el futuro como
Hombre Moderno? ¿Fue pleno su compromiso con la Ilustración?</span></div>
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<i><span style="font-size: 11pt;">Ésta,
y no otra, es mi obra, ésta, y no otra, ha sido mi vida </span><span style="font-size: 11pt; font-style: normal;">parecen decirnos esos restos casi deshechos, ese trozo de
cráneo milagrosamente conservado en el tiempo, esas hebillas de acero
recubiertas de cal, esas cenizas que si bien fueron de un hombre de iglesia,
también lo fueron de un Ilustrado.</span></i></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">COMPLEMENTO AL APUNTE BIOGRÁFICO DE VIERA Y
CLAVIJO</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">El esbozo biográfico que hemos incluido
aparece bastante sesgado hacia las actividades científicas de D. José Viera,
por lo que añadiremos aquí algunos comentarios sobre sus otras inclinaciones:
la literatura, la historia, la crítica de costumbres, las reflexiones sobre el
ejercicio eclesiástico, su preocupación educativa y la divulgación. A todas
ellas dedicó el abate su atención, más o menos intensa, a lo largo de los tres
periodos en los que podemos dividir su dilatada biografía: la época del Puerto
de la Orotava y La Laguna; su estancia en Madrid; la etapa final en Gran
Canaria.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">No cabe duda alguna que D. José tuvo siempre
aspiraciones poéticas y literarias y desde muy joven probó fortuna en este
terreno, guiado, eso sí y al igual que sucedería en el campo científico – donde
son rastreables, sin excesiva dificultad, los autores que le inspiraron –, por modelos de cierto éxito y renombre: <i>Porque había leído con gusto la historia de
Guzmán de Alfarache, escribió la de Jorge Sargo y entonces tenía catorce años, </i>dirá
en su Autobiografía, añadiendo más adelante, <i>(...) De esta temprana afición a la poesía nació sin duda la suma
facilidad con que en su primera juventud se hizo el afamado autor de loas,
entremeses, letras de villancicos, coplas, décimas, glosas, sátiras y otras
obras pueriles</i>, algunos de cuyos títulos, escritos durante su periodo de
formación en el Puerto de La Orotava, se citan a continuación: <i>Tragedia sobre la vida de Santa Genoveva; El
Rosario de las Musas o los quince misterios del Rosario; Las cuatro partes del
día y las ocupaciones ordinarias del hombre en ellas; Fruta del tiempo en el
Parnaso (Fruta verde del Parnaso); Abecedario de los nombres más usados de
hombres y mujeres. Cada uno descifrado en una décima; Baraja de cuarenta
cartas, La dama novelista o suma teológica moral, acomodada al estudio de una
señora </i>y el <i>Sermón de San Antonio de
Padua</i>. </span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Su estancia en La Laguna y la influencia del
espíritu que se respira en la Tertulia de Nava acentúan su vena irónica y
cáustica así como su beligerancia, y estimulan, al mismo tiempo, sus
incipientes dotes de cortesano, aún a distancia. Se estrena, así, con <i>Un sueño poético</i> – con motivo de las
exequias de la esposa de Fernando VI, Doña Bárbara de Braganza – y continúa con
las <i>Seguidillas a la ciudad de La Laguna.
Chulada burlesca a la perdurable intemperie de la ciudad de La Laguna; El
Herodes de las niñas, las viruelas; Títulos de comedias españolas adaptadas al
carácter de cada dama y caballero de La Laguna; Segunda parte de la historia
del famoso predicador Fr. Gerundio de Campazas; La Canaria o floresta de
dichos, agudezas y prontitudes acaecidas en las Canarias; Papel hebdomario; El
Piscator lacunense; El Jardín de las Hespérides: representación alegórica de
las Islas Canarias reconociendo por su Rey y Señor a nuestro católico monarca
Don Carlos III; Loas, coloquios y otras poesías con motivo de las mismas
fiestas</i>. A ellas se unirán los <i>Papeles
de la Tertulia</i>, en los que es reconocible la marca del abate que ya se ha
convertido en elemento esencial y dinamizador de la misma: <i>Gacetas de Daute, Los zapatos de terciopelo, Memoriales del Síndico
Personero </i>– al que dedicaremos mayor atención al esbozar la actividad
educativa y divulgativa de Viera –, <i>Las
cartas del viejo de Daute, El elogio del Barón de Pun, etc. </i>El <i>Poema de los Vasconautas </i>y la <i>Loa de adoración de Reyes</i> cierran su
actividad poética durante el periodo lagunero y la <i>Carta filosófica sobre la aurora boreal observada en la ciudad de La
Laguna en la noche del 18 de enero de 1770</i> su ocasional producción científica.
</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">El 12 de octubre de ese año embarca hacia la
Península con la intención, ya reseñada más arriba, de dar cumplido fin a la
obra en la que lleva trabajando desde 1763, <i>Noticias
de la Historia de Canarias</i>.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Su actividad en la Corte y las que, como
tutor y acompañante de un Grande de España, se ve obligado a desempeñar,
movilizan no sólo sus dotes de persuasión y su capacidad para entablar
relaciones convenientes sino también su ya desenvuelta y ligera pluma. Y así,
al mismo tiempo que prosigue su obra magna, elabora obrillas cortas, de las más
variadas materias, para completar la educación de su pupilo:<i> Idea de una buena lógica en diálogo;
Compendio de la Ética o Filosofía Moral; Nociones de Cronología; Epítome de la
Historia Romana, de la Historia de España y de la Historia Eclesiástica, etc.</i>,
comienza su actividad como traductor, a la que volverá con renovado ímpetu en
su etapa Gran Canaria, con la <i>Apología de
las mujeres, de Mr. Perrault</i> y poco después con el libro cuarto de la <i>Imitación de Cristo </i>y<i> </i>da rienda suelta a su retórica y
poética cortesana componiendo elogios y
loas en los que enaltece y lisonjea a señalados personajes o concurriendo a
certámenes y premios: <i>Oda a las parejas
de Aranjuez; Égloga genetlíaca </i>– con motivo del nacimiento del infante
Carlos Clemente –; <i>Elogio de Felipe V,
Rey de España; El segundo Agatocles, Cortés en Nueva España; La rendición de
Granada; Elogio de Don Alonso Tostado, etc. </i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Sus viajes por España y Europa le van a permitir
adquirir una visión más objetiva del abismo que existe entre su país y las
naciones ilustradas. Sus lecturas se hacen así carne. Por otra parte, los
conocimientos científicos adquiridos en los cursos a los que asistió le van a
procurar ciertos beneficios cortesanos al convertirse en <i>demostrador científico</i>, realizando espectaculares experiencias con
los aires fijos y componiendo los cuatro primeros cantos del poema <i>Los aires fixos </i>que publicamos.</span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">Su retorno a las Islas, y más en concreto a Gran
Canaria, no disminuye, pese al poso de amargura que le supone su falta de
reconocimiento oficial –el Arcedianato de Fuerteventura no parece suficiente
compensación para un hombre de sus merecimientos– , su ardor y su capacidad de
trabajo. Sus obras, durante los seis lustros de vida que le restan, abarcan
temas que van desde los asuntos religiosos –15 sermones– a las traducciones
de tragedias: <i>Las Barmecidas </i>y <i>El Conde de Warkvick </i>de La Harpe; <i>Junio Bruto </i>de Voltaire <i>La Merope </i>de Scipión Maffei; <i>Berenice </i>y <i>Mitrídates </i>de Racine, o de poemas: <i>La Elocuencia </i>de La Serre; <i>Los
Jardines </i>y <i>El hombre de los campos </i>de
Delille; <i>La felicidad </i>de Helvecio; <i>La Henriada </i>de Voltaire; <i>Las Sátiras </i>de Boileau, etc., pasando
por los trabajos que realiza en obsequio tanto de la corporación Eclesiástica a
la que pertenecía como de la Sociedad
Económica de Canaria y por los estudios de ciencias físico–naturales: <i>Las bodas de las plantas; El librito de la
Doctrina Rural; Las noticias del cielo; El Diccionario de Historia Natural de
Canarias, o índice alfabético de los tres reinos, animal, vegetal y mineral con
las correspondencia latina. </i></span></div>
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<span lang="ES-TRAD" style="font-size: 11pt;">El día 21 de Febero de 1813 Viera y Clavijo
finalizaría su periplo vital.</span></div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-91560579300252282452011-10-27T18:17:00.001+01:002011-10-27T18:18:42.237+01:00EL FIN DE ETA: ESCENOGRAFÍA Y REALIDAD<br />
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El 20 de octubre tres encapuchados anunciaban el "cese definitivo" de la "actividad armada" de la organización terrorista ETA en una declaración que conceptuaban como "histórica"; se ponía el broche al pronunciamiento de la conferencia en la que diversas personalidades internacionales pedían a la banda el "cese definitivo" de la violencia.</div>
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Debo confesar que me sorprendió la casi unánime valoración positiva -excepción hecha de UPyN- de las fuerzas políticas y que me sorprendió poco la recurrente y cansina cantinela de la caverna mediática y de los profesionales del libelo y la injuria tertuliana.</div>
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Animado por aquella coincidencia suscité el tema en un círculo de ideología conservadora y constaté la influencia perniciosa que las plataformas reaccionarias tienen sobre muchos ciudadanos de escasa capacidad crítica y cómo estos repiten a modo de mantra las venenosas consignas que ponen en circulación aquellos.</div>
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La argumentación de este sector ultraderechista que ya se había rasgado las vestiduras por la celebración de la conferencia internacional (?) pone ahora el énfasis, para minusvalorar lo sucedido y caracterizarlo, a lo Mayor Oreja, como una nueva "tregua trampa", en varios asuntos que conviene analizar:</div>
<ul>
<li>No han anunciado su disolución</li>
<li>No han entregado las armas</li>
<li>No han pedido perdón a las víctimas</li>
<li>Aparecen encapuchados y no a cara descubierta</li>
<li>Han conseguido sus objetivos: están en el Gobierno de diversas instituciones</li>
<li>Ha habido y habrá una negociación con concesiones a la banda </li>
</ul>
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En este tema del fin de la violencia suele olvidarse que, aparte del Estado, hay otro actor: la organización terrorista. Parece fuera de toda duda que los miembros de ETA no han sufrido, a lo Saulo, ninguna caída del caballo y mutado de verdugos a apóstoles. ¿Por qué se plantea, pues, ETA cesar en su actividad? La respuesta evidente es que su estrategia -aquella que se apoyaba en las armas- no ha producido los resultados que buscaban y, en este sentido, es legítimo afirmar que han fracasado; al mismo tiempo, no cabe minusvalorar el peso que en esa decisión ha tenido el éxito cosechado por el brazo político de la organización terrorista en las recientes elecciones municipales y autonómicas y las expectativas que este éxito les abre. Se ha producido una colisión de intereses y, esta vez, los políticos se han impuesto a los militares.<br />
<br />
Asumir un fracaso o gestionarlo no es, sin embargo, sencillo nunca y mucho menos
cuando en el camino ha habido sucesos de consecuencias irreversibles,
asesinatos para nosotros y muertes -necesarias de acuerdo con la
retórica de la secta criminal- para ellos y así la denominada izquierda abertzale ha montado una representación teatral de complicada escenografía no sólo para hacer casi indoloro la desaparición de una parte del elenco actoral -los terroristas- sino para comenzar a escribir -con su prosa- el relato de unos años terribles. </div>
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Resulta curioso, por otra parte, que aquellos que más claro tienen que los miembros de la banda no son otra cosa que desalmados se empeñen en instar a los terroristas a pedir perdón, como si de un ritual católico, con el que se lava la culpa, se tratara. Creo que el perdón no debe banalizarse y pasar a ser un acto más de una ceremonia teatral, el dolor que hay acumulado exige no una declaración colectiva que ocultaría las responsabilidades concretas sino la asumción personal -si esta llega- de esas responsabilidades, un acto individual.<br />
<br />
Se ha abierto una nueva etapa -¡no acaba de entenderse que aun haya quien lo ponga en duda!- que traerá nuevos desafíos y dosis considerables de indignación -¿cómo pueden tener tanto apoyo social los que han venido justificando hasta hace bien poco los asesinatos?- que habrá que administrar. A esta tarea y a la escritura del verdadero relato de estos hechos debe dirigirse la acción de esos siempre tan denostados políticos que, sin embargo, en este asunto, la desactivación del terrorismo, han evidenciado considerables dosis de nobleza y valor.<br />
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<br /></div>miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-11438328769454426582011-09-27T15:00:00.000+01:002011-09-27T15:00:26.219+01:00LA CRISIS DE LA FÍSICA CLÁSICA: OTRA FORMA DE VER EL MUNDO (y III)<div class="separator" style="clear: both; text-align: center;">
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<span style="font-size: small;"><b>LA FÍSICA CUÁNTICA</b></span></div>
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<b><span style="font-size: small;">B.l La historia inmediata
del Principio de Indeterminación</span></b></div>
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<span style="font-size: small;">El Principio de
Indeterminación aparece como pieza central en muchas exposiciones en las que se
habla de la quiebra del modo clásico de ver el mundo o del fin de la ilusión de
Laplace.</span></div>
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<span style="font-size: small;">En lo que sigue vamos a
trazar su historia inmediata intentando encontrar por un lado las razones por
las que ocupa esa posición de privilegio en el cuerpo teórico de la Mecánica
Cuántica y, por otro, aclarar algunos de los malentendidos que a su alrededor
se han producido.</span></div>
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<span style="font-size: small;">Resulta necesario presentar
una cronología, inevitablemente incompleta, de los "momentos" más
relevantes que precedieron a la publicación del artículo de Heisenberg <i>"On
the perceptual content of quantum theoretical kinematics and mechanics" </i>en
el que se expone por primera vez ese Principio que lleva su nombre.</span></div>
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<span style="font-size: small;">En septiembre de 1925 el
mismo Heisenberg publica en el Zeitschrift für Physik un artículo con el título
<i>"On a quantum-theoretical reinterpretation of kinematic and mechanical
relations" </i>cuyo objetivo ambicioso era <i>"establecer una base
para la mecánica cuántica teórica, fundada exclusivamente sobre relaciones
entre magnitudes que son, en principio, observables". </i>Se apostaba, de
un modo decidido, por una estrategia de aproximación a la ciencia de lo microfísico
guiada por el mismo método que había usado Einstein en su teoría de la
Relatividad.</span></div>
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<span style="font-size: small;">En ese mismo mes, Born (con
el que Heisenberg trabajaba) y Jordan envían,a la misma revista, su artículo <i>"On
Quantum Mechanics" </i>en el que desarrollan de modo sistemático la teoría
expuesta por Heisenberg, haciendo uso de la formulación matricial. </span></div>
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<span style="font-size: small;">En noviembre del mismo año
se recibe en la sede de los Proceedings de la Royal Society el trabajo de Dirac
<i>"The fundamental equations of Quantum Mechanics" </i>y ese mismo
mes, Born, Heisenberg y Jordan, completan y extienden el formalismo matricial a
sistemas microfísicos más complejos, en el artículo <i>"On Quantum
Mechanics </i>11" de la Zeitschrift für Physik.</span></div>
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<span style="font-size: small;">En marzo de 1926 Heisenberg
y Jordan publican <i>"The application of Quantum Mechanics to the problem
ofthe anomalous Zeeman effect" </i>en el que hacen uso de la hipótesis del
spin del electrón. La Mecánica Cuántica había encontrado una formulación
potente mediante el que podían abordarse de modo sistemático los fenómenos
atómicos.</span></div>
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<span style="font-size: small;">Justamente entonces aparece
el primero, de una serie de cuatro artículos escritos por Schrödinger , en el
que bajo el título <i>"Quantization as an eigen value problem" </i>se aborda la obtención de un
formalismo para la Mecánica Cuántica desde una perspectiva radicalmente
distinta de la de los constructores de la Mecánica de Matrices. Como el mismo
autor se encargaba de enfatizar <i>"mientras (ellos) acentúan la
existencia de saltos cuánticos, la pérdida de visualización de los movimientos
atómicos, el positivismo, etc., yo intento justamente lo contrario: una
transición desde la mecánica clásica puntual hacia una teoría continua. El
futuro desarrollo de la física cuántica se vería así mejor servida, práctica e
intelectualmente, por la adherencia a una mecánica ondulatoria casi visualizable
en vez de hacerlo por la sujeción a una teoría sobre la dinámica atómica en la
que se suprime la intuición y se opera sólo con conceptos abstractos tales como
probabilidades de transición, niveles de energía, etc.". </i>Las resonancias
del "modo clásico" de ver el mundo son obvias y el rechazo de la posición
positivista en ciencia también<span style="font-family: Arial;">. </span> El principio-guía de la
formulación de Schrödinger hay que buscarlo en las ideas sobre ondas de materia
expuestas por de Broglie. Si las ondas electromagnéticas se comportan como
partículas, por simetría parece lógico pensar que las partículas deben
comportarse bajo ciertas condiciones como ondas de materia. Y si ello es así,
pensó Schrbdinger, debe existir una "ecuación de ondas" que
represente la evolución o propagación de estas ondas de materia expresables por
medio de una función de ondas.</span></div>
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<span style="font-size: small;"><span style="font-family: Arial;"> </span>Las ondas de materia
reemplazan a los problemáticos electrones (bolas de materia discreta) y los
modos de vibración armónicos de las ondas de materia hacen lo mismo con las
extraños estados estacionarios de la teoría atómica de Bohr. Las transiciones
continuas entre modos de vibración sustituirían finalmente a los saltos
cuánticos discontinuos entre estados estacionarios de la mecánica matricial.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El entusiasmo que provoca esta aproximación que da reflejado en las palabras de Wilhelm Wien: "Ahora que
Schrödinger ha probado de una vez por todas lo absurdo de los saltos cuánticos
y ha puesto punto final a teorías basadas en esas nociones, sólo será cuestión
de tiempo resolver los restantes problemas por medio de la Mecánica
Ondulatoria" </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En Mayo de 1926 un
Schrödinger en plena euforia creativa publica una prueba en la que se muestra
la equivalencia matemática de su formalismo ondulatorio y el matricial de la
escuela de Gotinga-Copenhague. A partir de ese momento las diferencias se
centran en las interpretaciones físicas que subyacían en ambas formulaciones y
que, en última instancia, aunque fuera de un modo no excesivamente articulado,
las habían inspirado. Esta controversia constituye el sustrato de lo que luego
acabará plasmándose en la interpretación canónica de Copenhague y en la contestación
de los heterodoxos.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El desafío de Schródinger
recibe el aplauso de la comunidad de físicos, incómodos con la radical
aproximación de Bohr y su escuela18, e impulsa a estos últimos a elucidar de un modo
definitivo la situación interpretativa de la Mecánica Cuántica. Heisenberg
decide, pese a otras ofertas, ir a Copenhague para trabajar con Bohr.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">A finales de Julio de 1926
se produce en Munich el "encuentro" entre Heisenberg y Schrödinger con
motivo de una conferencia en la que éste expuso su teoría ondulatoria. Allí
Heisenberg manifiesta sus objeciones a la nueva teoría que, a su juicio, <i>"no
puede explicar fenómenos cuánticos básicos como la fórmula de radiación de
Plank, el efecto Compton, etc.,"; </i>fenómenos todos ellos en los que
parece requerirse la discontinuidad y los saltos.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En Septiembre de este año
Schrödinger es invitado al Instituto Bohr y allí se confrontan las dos
interpretaciones en un debate que no acercó posiciones y que forzó a Bohr y
Heisenberg a plantearse como tarea ineludible <i>"clarificar la relación
entre la mecánica cuántica y los datos de la experiencia". </i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgAIXlNOB66ghe-nTxOpXMeHyoqfTC_yY15CfIj-E1Aw4eSJEswVkRMjCyZDBKuT9AP58QZQS4ZfhUkMLnFxVEzIf87jr_aEwANydybfiwgESCQ46x0ST88VXq1gFFccQqIFkd5V4aTPV4/s1600/born.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgAIXlNOB66ghe-nTxOpXMeHyoqfTC_yY15CfIj-E1Aw4eSJEswVkRMjCyZDBKuT9AP58QZQS4ZfhUkMLnFxVEzIf87jr_aEwANydybfiwgESCQ46x0ST88VXq1gFFccQqIFkd5V4aTPV4/s1600/born.jpeg" /></a></div>
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">De esta tarea de
clarificación, -en la que jugó un papel importante la interpretación
probabilista de la función de ondas introducida por Born en Julio de 1926-,
surgiría tanto el Principio de Indeterminación como el Principio de
Complementariedad.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Todos estos elementos
acabarían configurando la llamada "interpretación de Copenhague".</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Heisenberg y Bohr se
plantearon clarificar la relación entre los datos de la experiencia y la
mecánica cuántica. Relación que se había convertido en problemática en términos
que podrían hacerse explícitos acudiendo a un ejemplo: la traza de un electrón
podía observarse en una cámara de niebla y su explicación en una u otra versión
de la Mecánica Cuántica presentaba dificultades ya que, por un lado, en su
formulación matricial negaba el concepto de órbita o camino y por otro, en la
formulación ondulatoria, cualquier "paquete de ondas" que representara
la partícula sufriría una dispersión al evolucionar, incompatible con las
dimensiones de la traza observada.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Heisenberg, en Febrero de
1927, se vió forzado a un replanteamiento del problema que contemplara, por un
lado, el hecho de que el formalismo de la Mecánica Cuántica era demasiado
exitoso como para prescindir de él, y por otro, el que las observaciones de
"la trayectoria" eran incontestables. ¿Cómo conciliar estos extremos?
En sus reminiscencias de aquellos años Heisenberg menciona que una y otra vez
acudió a su mente una frase que Einstein había intercalado en uno de sus
encuentros: <i>"Es la teoría la que decide lo que podemos observar".</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Guiado por ella y por su
convicción de que un análisis operacional ( también a "lo Einstein")
de los conceptos de posición y velocidad, o más exactamente su reinterpretación,
jugarían en la mecánica de los micro-objetos el mismo papel que el análisis de
la simultaneidad había jugado en la mecánica de los fenómenos de alta velocidad, Heisenberg
encaró el problema en los siguientes términos:</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">1) ¿Incluye el formalismo
el hecho de que la posición de una partícula y su velocidad son determinables
en un instante dado sólo con un grado de precisión limitado? y 2) ¿sería tal
imprecisión, si la teoría la admite, compatible con la precisión óptima
obtenible por medidas experimentales?</span></div>
<span style="font-size: small;"><span lang="EN-GB"></span></span>
<br />
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El Principio de
Indeterminación tuvo sus orígenes en la teoría de transformaciones de
Jordan-Dirac que Heisenberg utilizó para responder a la primera de las preguntas
planteadas anteriormente obteniendo, a partir de ella, las famosa relaciones:</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: center;">
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEimEyYyDUdltPAX3ruNQDei-Q0U8IoQ5rh0EIPmvj_thRBTpqw4j6AqYbWTf1yyvysv32OI3oEnOzLcqanE0xy9-zA2_OWhPDsIlV6iVTpg2TUuv70NvejrHvVKocVUM1gOR0PNlBz_FKU/s1600/principio+de+incertidumbre.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="148" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEimEyYyDUdltPAX3ruNQDei-Q0U8IoQ5rh0EIPmvj_thRBTpqw4j6AqYbWTf1yyvysv32OI3oEnOzLcqanE0xy9-zA2_OWhPDsIlV6iVTpg2TUuv70NvejrHvVKocVUM1gOR0PNlBz_FKU/s320/principio+de+incertidumbre.jpg" width="320" /></a></div>
<span style="font-size: small;"><i><span style="font-family: Arial;"></span></i><i><span style="font-family: Arial;"><br /></span></i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">De hecho alguno de los
aspectos cualitativos de esta relación de indeterminación habían sido
anunciados por los autores de esta teoría,
quienes sabían de la imposibilidad de
asignar valores precisos a p y q. - "No se puede
responder a ninguna cuestión en mecánica cuática que se refiera a valores
numericos para q y para p al mismo tiempo" diría Dirac y "Para un valor dado
de q, todos los valores de p son posibles", Jordan.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La tarea fundamental de Heisenberg fue el
determinar el alcance de esta imposibilidad, cuantificándola.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Para dar respuesta a la
segunda cuestión, Heisenberg analizó lo que desde entonces ha pasado a
denominarse el "experimento del microscopio de rayos gamma" (Ver <i>"The
physical Principles of the Quantum Theory". </i>W. Heisenberg. Dover,
págs. 21 y sig.). En este experimento se plantea el definir operacionalmente (en
línea con su concepción de la física a "lo Einstein") el concepto de "posición"
y, a pesar de un error (posteriormente corregido a instancias de Bohr y al hilo
de su famosa controversia), concluye con un resultado que corrobora la relación
teórica obtenida anteriormente.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg_M2brGOvnhZ5OXTX4wRB9JvNb-87Ddt7kGmumKE8OFtOD9XUjEWPDxV8DoL44_XNgkyMwo6N2bAqn5FMJXarfKYXlZhxJ1Qd9w8zfCW0bzXN3JVVn_bMyB0DxVfLKMJMQEeqE1JSR4y8/s1600/microscopio+heisenberg.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg_M2brGOvnhZ5OXTX4wRB9JvNb-87Ddt7kGmumKE8OFtOD9XUjEWPDxV8DoL44_XNgkyMwo6N2bAqn5FMJXarfKYXlZhxJ1Qd9w8zfCW0bzXN3JVVn_bMyB0DxVfLKMJMQEeqE1JSR4y8/s1600/microscopio+heisenberg.jpeg" /></a></div>
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Es éste <span style="font-family: inherit;">el </span>momento en que la polémica entre Bohr y Heisenberg adquiere su mayor
crudeza. Bohr intenta persuadirlo para que no publique el artículo en la forma
en que lo ha escrito porque, a su juicio, pone el énfasis no en lo sustancial, sino
en lo accesorio. Bohr no discute la validez de las relaciones de indeterminación
sino el soporte conceptual e interpretativo que le da Heisenberg.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Para Heisenberg la
indeterminación aparece como una limitación de la aplicabilidad de las nociones
clásicas de posición o momento a los fenómenos microfísicos, para Bohr estas
relaciones son una indicación, no de la inaplicabilidad de uno u otro lenguaje
(de la física de partículas o de la física ondulatoria), sino más bién de la
imposibilidad de usar ambos modos de expresión simultáneamente a pesar de que
sólo su uso combinado nos dé una descripción completa del fenómeno físico.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"> <span style="font-family: Arial;"></span>Mientras que para el
primero la razón de la indeterminación está en la discontinuidad, expresada en
términos del lenguaje corpuscular u ondulatorio, para el segundo la razón hay
que buscarla en la dualidad onda-corpúsculo (núcleo de lo que más tarde
articulará como Principio de Complementariedad).</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><b>B.2 Consecuencias filosóficas</b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El mismo Heisenberg se
encargó de explicitar en su artículo y en publicaciones posteriores algunas de
las profundas consecuencias que tanto para la física, entendida como ciencia de
lo real como para la indagación humana, tenían, su 'Principio de
Indeterminación y las nociones de Complementariedad desarrolladas por Bohr.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En primer lugar afirmó que
el formalismo de Jordan y Dirac sobre la Mecánica Cuántica -en el que había
apoyado su demostración- era completo y acabado. Las relaciones de indeterminación
eran pues irrefutables desde la perspectiva teórica.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En segundo lugar, y como
consecuencia de la completitud del formalismo y de su irrefutable
interpretación en términos de la indeterminación, todos los experimentos
realizados y por realizar no alterarían nunca la validez de la Mecánica
Cuántica ni podrían sobrepasar los limites de precisión impuestos por las
relaciones de indeterminación.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Heisenberg, consciente de
las implicaciones de sus relaciones de indeterminación, no dudaba extraer las
siguientes conclusiones: "... <i>en la formulación fuerte de la
causalidad "Si conocemos el presente con exactitud, podemos predecir el
futuro", no es la conclusión sino la premisa la que es falsa. No podemos conocer,
como cuestión de principio, el presente en todos sus detalles". </i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Estas implicaciones,
matizadas e incluso en ocasiones reformuladas por Bohr, se convirtieron en el
sello interpretativo de lo que se conoce como interpretación de Copenhague.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhtJ8HgCDHBTm8rlabOZK1XeEguh0SCFtDAgaIL57sJRHWuibE0P_ta9hn4ENQ8E1d8bxWJ2AxyxqiXQwQpK5M1frw-0LA5uOIW4LqESpm1uO7zIwCfp9tnKlYDw0apL5KtrgI-mBqASqo/s1600/einstein-bohr.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhtJ8HgCDHBTm8rlabOZK1XeEguh0SCFtDAgaIL57sJRHWuibE0P_ta9hn4ENQ8E1d8bxWJ2AxyxqiXQwQpK5M1frw-0LA5uOIW4LqESpm1uO7zIwCfp9tnKlYDw0apL5KtrgI-mBqASqo/s1600/einstein-bohr.jpg" /></a></div>
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El tercer pilar de esta
interpretación-, que acabaría convirtiéndose en canon después del V Congreso
Solvay de 1927 sobre "Electrones y fotones" en el que Bohr y Einstein
hicieron explícita sus discrepancias sobre la completitud de la descripción
cuántica y, más en profundidad, sobre la esencia de la Ciencia y la objetividad
del mundo- era el Principio de Complementariedad y a él vamos a dedicar algunos
comentarios.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<ul style="text-align: justify;">
<li><span style="font-size: small;"><span lang="EN-GB">La visión clásica del mundo, defendida apasionadamente por Einstein, se adecúa al sentido común, al afirmar la realidad objetiva del mundo exterior. Reconoce que nuestras observaciones interfieren y alteran el mundo pero de un modo incidental pudiendo hacerse arbitrariamente pequeñas. En particular, se considera que el microcosmos de los átomos y partículas difiere de la experiencia del macrocosmos en términos de escala pero no desde su status ontológico. Así, un electrón es una versión diminuta de una idealizada bola de billar y comparte con esta un conjunto completo de atributos dinémicos, tales como "estar en un lugar" (tener posición), moverse de una cierta forma (tener momento), etc. En un mundo clásico nuestras observaciones no crea la realidad: la desvelan. Los átomos y las partículas continúan existiendo con atributos bien definidos cuando no los observamos. </span></span></li>
</ul>
<div>
</div>
<ul style="text-align: justify;">
<li><span style="font-size: small;"><span lang="EN-GB">Por contraste, la interpretación de Copenhague de la Mecánica Cuántica rechaza la realidad objetiva del microcosmos cuantico. Niega que, digamos, un electrón tenga una posición bien definida o un momento bien definido en ausencia de una medida de uno u otro (y ambos no pueden tener valores precisos simultáneamente). En consecuencia un electrón o un átomo no pueden ser considerados simples objetos diminutos en el mismo sentido en que una bola de billar es un objeto. </span><span lang="EN-GB">No puede hablarse de forma significativa sobre lo que un electrón está haciendo entre dos observaciones, porque es la observación la que crea la realidad del electrón. Así, la medida de la posición del electrón crea un electrón con posición y la de su momento crea un electrón con momento. Pero a ninguna entidad puede considerarse existente antes de que la medida se realice. ¿Qué es entonces un electrón de acuerdo con este punto de vista? No es pues tanto un objeto físico como un conjunto de potencialidades o posibles resultados de medidas. Es un conciso modo de referirse a un modo de conectar observaciones a través del formalismo mecanocuántico. Pero la realidad está en las observaciones, no en los electrones.</span></span></li>
</ul>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"> La aguda controversia con
Heisenberg sobre como interpretar las relaciones de indeterminación acabó
impulsando a Bohr a poner en claro lo que había sido objeto de profundas
reflexiones durante el período que se extiende desde Julio de 1925 hasta
septiembre de 1927. En esta fecha y con motivo de una reunión en memoria de
Volta celebrada en Como, plantea la necesidad de desarrollar un concepto de
largo alcance, el principio de complementariedad, con el que pueda
interpretarse de un modo acabado y coherente la nueva teoría cuántica.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Estas son sus palabras: <i>La
misma naturaleza de la teoría cuántica nos fuerza a considerar la coordinación
espacio-temporal y la expresión de la causalidad, cuya unión caracteriza a la
teoría clásica, como características complementarias pero excluyentes de la
descripción, simbolizando, respectivamente, la idealización de la observación y
la definición.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiXeutD_7vCTz_DDT6KxxKVe6cu2APWzlQTteMKr3S2VB2cIELtHTpmbLilP7mX01MGKOmyNh1KfgR4ly5zYvofv7VJL8GJ4ufQc5Ohhxpfqe8aPfKN9fEVzYn3MJQkAegI5cyLbuf94Vk/s1600/doble-rendija.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiXeutD_7vCTz_DDT6KxxKVe6cu2APWzlQTteMKr3S2VB2cIELtHTpmbLilP7mX01MGKOmyNh1KfgR4ly5zYvofv7VJL8GJ4ufQc5Ohhxpfqe8aPfKN9fEVzYn3MJQkAegI5cyLbuf94Vk/s320/doble-rendija.gif" width="320" /></a></div>
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Este principio reconoce
como inherente a los sistemas cuánticos la ambiguedad esencial de que el mismo
sistema pueda mostrar propiedades aparentemente contradictorias. Un electrón,
como claramente muestra el experimento de la doble rendija desarrollado en el
Capítulo 1 del Volumen 3 <i>"Lectures on Physics" </i>de Richard <span style="font-family: inherit;">P. </span>Feynmann, puede por ejemplo comportarse como onda y como partícula y
para Bohr ello sólo indica que estas manifestaciones son facetas
complementarias, (¡no contradictorias!) de una única realidad: un experimento nos
puede revelar la naturaleza ondulatoria del electrón y otro la corpuscular, pero,
ambas no pueden manifestarse a la vez; la elección del experimento a realizar
determina cual de las dos naturaleza va a mostrarse. De modo similar, la posición
y el momento son complementarios, aunque en un sentido más restringido,
<span style="font-family: Arial;">y </span>es el experimentador quien, otra vez, decide cuál de
ellos va a observar -</span><span style="font-size: small;">la posición y el momento
no son nociones mutuamente excluyentes, puesto que se necesitan ambas para
especificar el estado de un sistema, y ambas se pueden medir en un mismo
experimento. Pero son complementarias en el sentido restringido de que no se
pueden determinar ambas simultáneamente con la precisión que deseemos; es
decir, cuanta más precisión consigamos en una medición, menos podremos
conseguir en la otra. En contraposición, los aspectos ondulatorios y de
partícula que tiene la materia son complementarios y mutuamente excluyentes:
una entidad atómica no puede exhibir simultáneamente sus propiedades de
partícula y onda. Es ésta la razón por la que se afirma, con frecuencia, que la
complementariedad trasciende el principio de indeterminación de Heisenberg.</span><br />
<br />
<div style="text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEijKsWMG0pwcojwipfk983dpwwPzlvoQ-kL98zy2rKN1mZX59z5f5mOkU-NQ17kRSd-b9A8f5kPsSJZXWor38kxotXYqFMUxg0s4yKftwInAVXuoeqhYwRbR_Etfhy53IGDZ3fBHM2yjWI/s1600/bohr1.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEijKsWMG0pwcojwipfk983dpwwPzlvoQ-kL98zy2rKN1mZX59z5f5mOkU-NQ17kRSd-b9A8f5kPsSJZXWor38kxotXYqFMUxg0s4yKftwInAVXuoeqhYwRbR_Etfhy53IGDZ3fBHM2yjWI/s320/bohr1.jpg" width="223" /></a></div>
<br />
<span style="font-size: small;">Bohr hace residir la complementariedad y la esencia de la
Física Cuántica en la dualidad onda/corpúsculo y por ello es por lo que
polemiza con tanta vehemencia con Heisenberg, quien pone el énfasis
interpretativo del Principio de Indeterminación en la "atomicidad de la
acción". Bohr no admite que la balanza se incline hacia uno de los
aspectos, sustancial eso sí pero incompleto, de la teoría cuántica. Lo novedoso
de la formulación de Bohr radica, como expresó Holton, en que a diferencia de
lo que había ocurrido hasta entonces en el desarrollo de la ciencia cuando se
enfrentaban visiones contrapuestas (conflicto entre "thematha")
-intento de englobar uno de los "thematha" en el otro (al modo en que
él mismo había procedido cuando enunció el Principio de Correspondencia)-, Bohr
pedía ahora a los físicos que aceptasen tanto una visión como otra, aunque no
se considerase a ambas centro de atención al mismo tiempo.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">No se trataba pues de
transformar un thema y otro en una nueva entidad. Lo que sucede más bien es que
ambos (continuidad/discontinuidad, onda/partícula) existen en la forma "o uno u
otro" dependiendo de la elección de las preguntas teóricas o experimentales que
decidamos hacer. Bohr encontraba una verdad básica en la existencia de una
paradoja que todos los demás estaban tratando de eliminar."</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><b>B.3 Sobre las posiciones
filosóficas en torno a la ciencia.</b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">A lo largo de la historia
de la ciencia, unas veces de modo conscientemente asumido <span style="font-family: Arial;">y </span>otras de forma tácita, la mayor parte de los físicos admiten que su
disciplina trata del mundo real, del mundo de los objetos, de los cambios. El
concepto de lo real es, sin embargo, problemático; está construido a partir de
nuestra experiencia inmediata, por un proceso de depuración que no puede, no
obstante, desligarse total <span style="font-family: Arial;">y </span>radicalmente de sus orígenes. De
ahí precisamente nacen muchas de las dificultades que encontramos cuando el
objeto de nuestra indagación se aleja de esa región del mesocosmos para la que
estamos biologicamente adaptados <span style="font-family: Arial;">y </span>de la que hemos
entresacado "los conceptos familiares (objeto, posición, instante, etc.)
que erigimos en elementos de realidad". De ahí las dificultades interpretativas que surgen en la mecánica de lo
muy rápido y de lo muy pequeño y muy grande.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">No es extraño que
justamente al hilo de la reflexión sobre la teoría de la relatividad y la
mecánica cuántica y de las "extrañas y paradójicas" consecuencias que
de ambas parecen inferirse, se hayan enfrentado, de un modo radical a veces,
dos corrientes de pensamiento que simplificadamente calificaremos usando la
terminología de Bemard d'Espagnat como materialista (o realista) y positivista (o
filosofía de la experiencia).</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Según la primera de estas
concepciones es sensato y justo afirmar que existe una realidad y que es
independiente del espíritu humano. Éste puede progresar en la dirección de un
conocimiento cada vez mejor de dicha realidad. La consecusión de ese
conocimiento es precisamente el fin de la ciencia. No puede negarse que esta corriente
filosófica hunde sus raíces en la tradición de la física clásica y se ve
seriamente contestada por los espectaculares éxitos alcanzados por la posición
positivista en el ámbito de la física moderna.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Para la filosofía de la
experiencia, o por lo menos para algunos de sus representantes, no es que se
afirme la inexistencia de una realidad independiente, sino que de modo más
sutil se relega esta noción a un segundo plano afirmándose el hecho evidente de
que lo que nosotros podemos conocer es sólamente el conjunto de nuestras
observaciones y nuestros actos. Nos pone pues en guardia contra la idea de aparente
sentido común consistente en "atribuir nuestras percepciones a una causa y
concebir por ello una realidad independiente que desempeña este papel
causal". Esta advertencia ha mostrado su fecundidad a lo largo de la
historia de la ciencia deshaciendo una y otra vez las nociones de realidad
pretendidamente alcanzadas por la ciencia -de hecho,</span><span style="font-size: small;"> la filosofía de la
experiencia encontró apoyo en la crítica efectuada por Einstein a la noción de simultaneidad
de sucesos espacialmente separados y al énfasis prestado a la definición
operacional de nociones hasta entonces no problemáticas. Mayor apoyo encontró
aun en la interpretación ortodoxa de la Mecánica Cuántica</span><span style="font-size: small;">.
La finalidad de ésta no sería pues el conocimiento
de una realidad subyacente a la que no tenemos acceso, sino que, por el
contrario, consistiría exclusivamente en hacer una síntesis de las
observaciones y proporcionar reglas (matemáticas) que, a partir de las
observaciones pasadas, permitan ciertas predicciones en cuanto a los resultados
de las experiencias futuras.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Resulta, sin embargo,
difícil pensar que la infalibilidad de una receta no tenga una razón de ser,
que, (y aquí aparece otra vez ese temido salto desde la apariencia a la esencia -</span><span style="font-size: small;">si apariencia y esencia
fueran la misma cosa, no habría necesidad de ciencia (ni de filosofía)-</span><span style="font-size: small;">, no sería
otra que la existencia de una realidad independiente, estructurada, cuyas estructuras tendrían además como
consecuencia justamente el que la receta deba salir bien, la regularidad. En la
visión realista el principal interés que presenta el descubrimiento de una
receta que funciona reside en el hecho de que nos da luz sobre las estructuras ocultas
de la realidad independiente.</span><br />
</div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Quisiéramos acabar nuestra
exposición con una larga cita de Alastair Rae en su libro Física cuántica
¿Ilusión o realidad? que refleja con nitidez la posición adoptada por muchos
físicos ante los desafíos planteados por la radicalidad de algunos de los
presupuestos de esta extraña teoría: <i>"Como
muchas personas formadas en </i>(o <i>quizás deformadas por) la tradición de Copenhague, yo
digo "Sí, es una ilusión. </i><i style="font-family: inherit;">La </i><i>partícula no
tiene posición, -no es realmente una partícula-, si no se diseña un experimento
para hacer una medida de esta propiedad". No obstante, soy muy consciente
de que esta clase de ideas no surgen fácil y naturalmente sino que parecen ser
una consecuencia forzada por el desarrollo de la física cuántica. Algunos
investigadores del XIX argumentaban, desde una posición positivista, que la
idea de átomo como constituyente de la materia era un postulado que carecía de
significado porque no podía ser sometido a prueba directa; sin embargo, todos
nosotros aceptamos hoy en día la realidad de la existencia de los átomos como
un hecho objetivo directamente verificable. </i>¿<i>No podría ser que la interpretación de Copenhague nos esté forzando
equivocadamente a calificar de ilusiones cantidades que son por completo reales
y que serán observadas cuando nuestro conocimiento y tecnología progresen lo
suficiente? Pensamientos como éstos son los que harían que la idea de las
variables ocultas pareciese plausible y atractiva, ¡si no fuese porque ninguna
teoría de variables ocultas (que preserve la localidad) es capaz de predecir
los resultados de los experimentos de correlación de pares de fotones (Aspect)!
El que esto no haya sucedido (el desarrollo de una teoría de
variables ocultas sobre la base de un modelo simple del mundo microscópico) es
la razón por la cual yo, junto con muchos otros físicos, he tenido que aceptar
las ideas de Copenhague. No porque nos gustasen en particular, sino porque es
el único modo de describir de cerca el comportamiento del mundo físico. Como
señaló Bohr, muchas veces es la naturaleza misma y no nuestra naturaleza la que
nos obliga a adoptar esta nueva y en cierta medida poco confortable manera de
pensar".</i></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzcOk9hRlDGDu4TURyY94hYOSahn0nA69zN09oFhTt5RuONmWofcMN-BrTDfJ840J-bta9-OcGc8bO937Jk2JHzpGGA9yQLKQu4T2nIz7SV-2eyKkB-Sz4BOVKOubAQkX_ZIxnmI7gJys/s1600/schiele.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzcOk9hRlDGDu4TURyY94hYOSahn0nA69zN09oFhTt5RuONmWofcMN-BrTDfJ840J-bta9-OcGc8bO937Jk2JHzpGGA9yQLKQu4T2nIz7SV-2eyKkB-Sz4BOVKOubAQkX_ZIxnmI7gJys/s1600/schiele.jpeg" /></a></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><b><i>BIBLIOGRAFÍA</i></b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><u><i>Sobre la época</i></u></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Número monográfico de la
Revista "DEBATS" dedicado a "Berlín 1905 - 1933", Diciembre
1987.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Cultura en Weimar,
causalidad y teoría cuántica, 1918-1927, Alianza, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><u><i><span lang="EN-GB">Sobre los personajes</span></i></u></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Uncertainty The life and science of Werner Heisenberg, David </span><span lang="EN-GB" style="font-family: Arial;">C.
</span><span lang="EN-GB">Cassidy,
Freeman, N. York</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El señor es sutil... La
ciencia y la vida de Albert Einstein Ariel, Barcelona</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Encuentros y conversaciones
con Einstein, W. Heisenberg, Alianza, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Ciencia y conciencia en la
era atómica, Max y Hedwig Born, Alianza, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><u><i><span lang="EN-GB">Sobre Relatividad</span></i></u></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">The principIe of relativity, Einstein, Lorentz... , Dover, N. York</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Sobre la teoría de la
relatividad especial y general, Einstein, Alianza, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El origen y desarrollo de
la relatividad, J.M. Sánchez Ron, Alianza, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Relatividad Especial, A.P.
French, </span><span style="font-size: small;"><span style="font-family: HiddenHorzOCR;">Revert</span>é<span style="font-family: HiddenHorzOCR;">, </span>Barcelona</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Special theory of relativity, D. Bohm, W.A. Benjamin Inc., N. York</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><u><i>Sobre Física Cuántica</i></u></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La teoría atómica y la
descripción de la naturaleza, N.Bohr, Alianza, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Sources of Quantum Mechanics, Edited by B.L. van der Waerden Dover, N. York</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">The physical principIes of the Quantum Theory, W. Heisenberg, Dover, N. York</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">The conceptual development of Quantum Mechanics, Max Jammer, McGraw-Hill,
N. York</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Phisics and philosophy, W. Heisenberg, Penguin Books, London</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Continuidad y
discontinuidad en física moderna, L. de Broglie, Espasa Calpe, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><u><i>Sobre Filosofía de la
Física</i></u></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El impacto filosófico de la
física contemporánea, Milic Capek, Tecnos, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Filosofía de la física,
Lawrence Sklar, Alianza, Madrid.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En busca de lo real. La
visión de un físico, Bernard d'Espagnat, Alianza, Madrid</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">The philosophy of space and time, Hans Reichenbach, Dover, N. York</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">The philosophy of Quantum Mechanics, Max Jammer, John Wiley, N. York</span><span lang="EN-GB"></span></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-18928082008568568222011-09-22T18:06:00.001+01:002011-09-22T18:07:44.406+01:00LA CRISIS DE LA FÍSICA CLÁSICA: OTRA FORMA DE VER EL MUNDO (II)<div class="separator" style="clear: both; text-align: center;">
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<div align="center" class="MsoNormal" style="text-align: center;">
<span style="font-size: small;"><b>EL CUESTIONAMIENTO DEL MODELO CLÁSICO</b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">A) <b>La Teoría de la
Relatividad</b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><b>a. l Apuntes históricos</b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Los desarrollos de la
ciencia de la Electricidad y el Magnetismo se habían concluido prácticamente,
al menos en sus aspectos fundamentales, con la formulación de las ecuaciones de
Maxwell (que describen la evolución espacial y temporal de los "campos
electromagnéticos" mediante los que puede darse cuenta de las acciones
eléctricas y magnéticas). A partir de ellas fué posible mostrar la propagación
de esas acciones mediante ondas cuya velocidad coincidía con la de la luz. Una
nueva síntesis, que recordaba la unificación newtoniana entre física celeste y
terrestre, apareció en el horizonte inmediato: la escurridiza luz pareció
finalmente quedar atrapada por el intelecto humano.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Ya hemos señalado con
anterioridad como se integró esta teoría, en el modelo clásico. El edificio
aparecía espléndido y acabado a pesar de que aún faltaran "algunos
adornos". Uno de estos adornos, -el medio en el que se propagaban las
ondas electromagnéticas, la luz: el "éter electromagnético" de
extrañas propiedades (rígido a fin de soportar veloces ondas transversales y
sutil para no actuar de freno a los observados movimientos de los objetos
celestes)-, resultó difícil de acoplar (¡no había modo de encontrarlo!).</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Por otra parte, la
detección de este medio podría servir como prueba de existencia de un sistema
inercial privilegiado <span style="font-family: inherit;">(¡el espacio absoluto!) </span>distinguible del resto de los
sistemas inerciales porque sólo en él se cumplirían las ecuaciones de Maxwell. Las
razones hay que buscarlas en el hecho de que, de acuerdo con el Principio de
Relatividad de Galileo, las leyes de la Mecánica de Newton son invariantes
(siguen siendo las mismas) en todos los sistemas inerciales (que se mueven con
velocidad V constante) conectados por las leyes de transformación:</span></div>
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<br /></div>
<div align="center" class="MsoNormal" style="text-align: center;">
<span style="font-size: small;"><span style="font-family: Arial;">r </span>=<span style="font-family: Arial;"> r' + V t</span></span></div>
<div align="center" class="MsoNormal" style="text-align: center;">
<span style="font-size: small;"><span style="font-family: Arial;">t =
t'</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">y, por el contrario, las
leyes del electromagnetismo (las ecuaciones de Maxwell) no lo son.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Recordemos que <span style="font-family: Arial;">el </span>hecho de que se verificara el Principio de Relatividad de Galileo (al
menos para la Mecánica) mostraba las dificultades que existían en la
identificación de un pretendido espacio absoluto. En efecto, todos los sistemas
inerciales serían dinámicamente equivalentes y si existiera tal espacio
absoluto sin movimiento, su existencia sería mecánicamente inverificable.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Tal imposibilidad no se
aplicaría, sin embargo, a las experiencias ópticas ya que al no ser idénticas
las leyes que rigen el electromagnetismo (y por tanto también la óptica) en los
diferentes sistemas inerciales conectados mediante las transformaciones de
Galileo tampoco lo serían sus acciones. El sistema inercial privilegiado (el
correspondiente al espacio absoluto) sería, pues, aquél en <span style="font-family: Arial;">el </span>que el éter (medio soporte de la propagación de las ondas electromagnéticas)
está en reposo y en el que la velocidad de las ondas resulta ser la
"verdadera velocidad".</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Los físicos de la época
(finales del XIX y principios del XX) concentraron gran parte de sus esfuerzos
a la detección de movimientos respecto al éter. Los resultados, contradictorios
y extraños, suscitaron una polémica, (preludio de la que unos años más tarde
constituiría uno de los núcleos de la teoría cuántica) en torno a la verdadera
naturaleza (¿onda o corpúsculo?) de la escurridiza luz.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En el cuadro adjunto se
recogen las evidencias a favor y en contra de los dos modelos básicos
(corpuscular y ondulatorio) sobre la naturaleza de la luz.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">1. La luz viaja en línea
recta</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">2. Efectos de interferencia
y difracción</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">3. Polarización de la luz</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span style="font-family: Arial;">4. </span>La velocidad de la luz es independiente de la velocidad
de la fuente</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">5. La velocidad de la luz
es mayor en el aire que en el agua</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">6. Experimento de Fizeau y
experimento de Airy (con el telescopio lleno de agua)</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">7. Aberración estelar
(Bradley)</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">8. Experimento de Michelson-Morley</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>Modelo corpuscular</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Correcto</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">No ofrece explicación
convincente</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">No ofrece explicación
convincente</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Desacuerdo claro</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Desacuerdo claro</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Requiere un arrastre
parcial de la luz por el medio</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Correcto</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Correcto</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>Modelo onda/éter</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Válido si la longitud de
onda << anchura del rayo</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Correcto</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Correcto</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Correcto</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Correcto</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Requiere un arrastre
parcial de la luz por el medio</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Válido si la Tierra se
mueve respecto al éter</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Implica que la Tierra <i>no
</i>se mueve respecto al éter</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Conviene hacer aquí
referencia a los importantes experimentos de Michelson (1881), y de él mismo en
colaboración con Morley, en los que haciendo uso de un montaje interferométrico
obtiene un inesperado y sorprendente resultado nulo para el movimiento de la
Tierra a través del hipotético éter (ver Banesh Hoffmann <i>"La
relatividad y sus orígenes". </i>Labor, págs. 76 y sig.).</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj9ZszQVYO7BoU1ztx9mOYSth0jfz4PIybeWEygxRdShDjE6QMFsFtlBwxlTOfXELqwexGqdxYcc_O3PutKUxG2ZK6IgonbGEOj9_O-_Xh7haToRV0wUuJFRAE3IhxF8GISjhqsLuAzRec/s1600/LORENTZ+PERSONAJE.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj9ZszQVYO7BoU1ztx9mOYSth0jfz4PIybeWEygxRdShDjE6QMFsFtlBwxlTOfXELqwexGqdxYcc_O3PutKUxG2ZK6IgonbGEOj9_O-_Xh7haToRV0wUuJFRAE3IhxF8GISjhqsLuAzRec/s1600/LORENTZ+PERSONAJE.jpeg" /></a></div>
<br />
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Teóricos del
Electromagnetismo como Fitzgerald, Lorentz, etc., proponen diversas soluciones
(acortamiento real de longitudes en la dirección del movimiento y, en el caso
de Lorentz, introducción de un tiempo local en el sistema de referencia
móvil·cuyo ritmo sea más lento) con las que, manteniendo la fidelidad a la
hipótesis del éter y al modo clásico de ver el mundo, se "salven las
apariencias".</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Para Lorentz es justamente
la existencia de este éter con su acción sobre la "materia ordinaria"
la que permite entender tanto el acortamiento real de longitudes como la
dilatación real de los intervalos temporales medidos por relojes que ven
alterados sus ritmos periódicos en los sistemas de referencia móviles.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Seguiría existiendo, sin
embargo en esta concepción, un tiempo absoluto cuyo discurrir coincidiría con
el de los relojes en reposo en el medio estacionario (en el espacio absoluto).
La visión absolutista, pero también la relacional sobre el espacio y el tiempo
parecen estar planeando en la concepción lorentziana.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En 1905, como ya apuntamos
anteriormente, Einstein publica su famosísimo artículo <i>"Sobre la
electrodinámica de cuerpos en movimiento" </i>donde, a partir de
consideraciones sobre la absurda asimetría explicativa de fenómenos
electromagnéticos corrientes y sobre la imposibilidad de detección de cambios
en el valor de la velocidad de la luz medida desde diferentes sistemas de
referencia (aunque sin conceder especial relevancia al resultado de Michelson),
introduce modificaciones radicales en nociones hasta entonces admitidas sin
discusión.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Einstein construirá toda su
teoría de la Relatividad Especial sobre dos postulados que parecen, en términos
de nuestras concepciones clásicas, contradictorios:</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">1) Las leyes de la física
(las de la mecánica y las del electromagnetismo) son válidas en todos los
sistemas inerciales.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">2) La velocidad de la luz
en el vacío es constante e independiente del estado de movimiento del cuerpo
emisor.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">A lo largo de ese artículo
Einstein someterá, en primer lugar, a análisis el concepto de simultaneidad
(ver Robert Resnick, <i>"Introducción a la Teoría especial de la
Relatividad". </i>Limusa, págs. 47 y sig.), que en la formulación clásica
parecía hallarse exento de contradicciones y aquí devendrá problemático, para,
a continuación, obtener el conjunto de transformaciones entre sistemas
inerciales que tenga como <i>invariantes</i>
las leyes del Electromagnetismo (o de otro modo el Postulado 2 de constancia de
la velocidad de la luz). </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>El propósito de cualquier teoría física es describir
de una manera concisa una gran variedad de fenómenos. En muchos casos esto
necesitará, como parte de la teoría, una prescripción para aplicar la teoría a
sistemas que se encuentren en estados de movimiento diferentes. Una
prescripción de este tipo, es decir, una especie de código de traducción,
consistirá generalmente en un sistema matemático de leyes de transformación.
Pertenece a la naturaleza de las leyes de transformación el cambiar la mayor parte
de las cantidades y el dejar invariantes algunas de ellas. Estas últimas son
los denominados invariantes de la transformación y sirven para definir su
carácter. Una afirmación en el terreno de la Física de cuales son estos
invaIiantes se denomina principio de relatividad, y las ecuaciones
fundamentales de una teoría definen generalmente el principio de relatividad
que le es aplicable.</i> Bondi H. Rept.
Progr. Phys., 22, (1959)</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Estas transformaciones<span style="font-family: HiddenHorzOCR;">
</span>recibirán el nombre de <i>Transformaciones de Lorentz</i> y su formulación
es la que sigue para el caso sencillo de Sistemas de Referencia que se mueven
paralelamente según el eje X y cuyos orígenes coincide en los instantes t =t'
=O:</span><br />
<br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjI64JCT-9OwGy4cl2_vuiLGiMHzuTvhuaQYlALONWRRlMAItuTE7fdeTmIup2CENMwVl-RTYk_q9cRY_AgK4i7zrfeSLoagOQYFuJh4XeX9HkAzb7rXUuuXnaPnFkp7W0iqsbOVc6lZV4/s1600/LORENTZ+3.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjI64JCT-9OwGy4cl2_vuiLGiMHzuTvhuaQYlALONWRRlMAItuTE7fdeTmIup2CENMwVl-RTYk_q9cRY_AgK4i7zrfeSLoagOQYFuJh4XeX9HkAzb7rXUuuXnaPnFkp7W0iqsbOVc6lZV4/s1600/LORENTZ+3.jpeg" /></a></div>
</div>
<div class="MsoNormal" style="text-align: center;">
<span style="font-size: small;"> <span style="font-family: Arial;">LAS TRANSFORMACIONES DE
LORENTZ - EINSTEIN</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhZGKjR1OnJfQnXjnMd8etm_qP2AHUwtgLeDtknDhiMT_RksGvBHjUX8IPgi5iDOJsz4UCwRWPPuWtWLAcmmfET-vi_LYSp5ACpJl5MKTwhyphenhyphen9yReBdvQeADzIoxYxmz2j5XDe6KiqAs2kc/s1600/LORENTZ+2.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhZGKjR1OnJfQnXjnMd8etm_qP2AHUwtgLeDtknDhiMT_RksGvBHjUX8IPgi5iDOJsz4UCwRWPPuWtWLAcmmfET-vi_LYSp5ACpJl5MKTwhyphenhyphen9yReBdvQeADzIoxYxmz2j5XDe6KiqAs2kc/s1600/LORENTZ+2.jpeg" /></a></div>
</div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El resto del artículo lo
dedica a extraer consecuencias físicas tanto para la cinemática (contracción
aparente de cuerpos en movimiento inercial al ser medidos por un observador en
otro sistema inercial, dilatación temporal) como para la electrodinámica
(encontrando aquí la clave de las aparentes asimetrías con las que había dado
comienzo a su artículo) y la mecánica (cuyas leyes hay que enmendar; aparece
así una dependencia de la masa con la velocidad de la que parece inferirse la
famosa ecuación E = <span style="font-family: "Times New Roman";">mc<sup>2</sup></span><span style="font-family: Arial;"> </span></span><span style="font-size: small;">que sólo se hará explícita en un artículo posterior).</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En 1916 Einstein publica en
Annalen der Physik el artículo <i>"Los fundamentos de la teoría de la
relatividad general" </i>donde da cima a sus trabajos sobre como
incorporar la Gravitación (o los sistemas acelerados) al esquema conceptual explicitado
en su teoría especial de la Relatividad. En fecha tan temprana como Noviembre
de 1907 Einstein exclamará: <i>" Estaba
sentado en una silla de la oficina de patentes en Berna cuando, súbitamente, se
me ocurrió la idea más feliz de mi vida: isi una persona cae libremente, no
sentirá su propio peso!".</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Sobre esta idea Einstein
articuló lo que suele denominarse Principio de Equivalencia y cuyo enunciado
podemos expresar así: En un sistema de referencia de dimensiones reducidas que
cae libremente en nuestro campo gravitatorio, las leyes de la física deben ser
las mismas que para un sistema de referencia en un idealizado universo libre de
gravitación (o en otras palabras: un sistema en caída gravitacional libre me
permite eliminar la gravitación). La razón de esta especial propiedad reside en
la igualdad entre la masa inercial y la masa gravitatoria y cuya expresión más
obvia, pero no por ello menos enigmática, se manifiesta en la ley de caída de
los cuerpos (discutida ya por Galileo en sus famosos <i>Discorsi</i>): todos los cuerpos caen el el vacío con idéntica
aceleración.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Así, pues, 1) toda aceleración
simula la gravedad y 2) la gravedad puede desaparecer en un sistema de
referencia acelerado convenientemente.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">No resulta sencillo
trasmitir de modo intuitivo, visualizable, (no olvidemos la paulatina
destrucción del confortable "cuadro clásico" que hemos ido llevando acabo)
esta geometrización de la mecánica y esta mecanización de la geometría que la
Relatividad General comporta. La idea básica es que: 1) cualquier cuerpo
moviéndose en un campo gravitatorio (por ejemplo el terrestre que supondremos
uniforme por simplificar) ejecuta trayectorias que, por un lado son independientes
de la masa del objeto móvil (cualquier objeto lanzado desde el mismo sitio con
igual velocidad inicial describe idéntica trayectoria) y por otro, que
cualquiera de las infinitas trayectorias que puedan imaginarse variando las condiciones
iniciales poseerá la misma curvatura (curvatura que obviamente sí es
dependiente de la intensidad del campo gravitatorio) en el espacio-tiempo, es decir,
2) el movimiento de cualquier masa se verá guiado a lo largo de geodésicas, en
todos los casos por igual, por la geometría (la curvatura) de ese espacio-tiempo
de un modo que sólo pálidamente refleja la analogía del movimiento de un objeto
constreñido a desplazarse sobre los círculos máximos de la superficie de una
esfera.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La búsqueda de Einstein a
lo largo de ese período que va desde 1907 a 1916 se dirige a la obtención de
las ecuaciones que reflejen cómo la materia (en su sentido relativista de
masa-energía) distorsiona ("arruga") el espacio-tiempo. Expresado en
un lenguaje más técnico diríamos que las ecuaciones de campo de Einstein
escritas, de modo definitivo en ese artículo de 1916, no hacen más que relacionar
el tensor curvatura y el tensor energía-impulso colocando entre ellos un signo
de igualdad:<i> ¡la materia crea la
curvatura, la curvatura hace mover a la materia!. La materia dicta al
espacio-tiempo cómo debe curvarse, el espacio dicta a la materia cómo debe
moverse.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEieJ-GJGIq4bKBObUkzLMbPXBM5GoiQRVSpNRVjvXNlBzhATdS6ybe0hyBqPTEuT8ojKyo5HA8Jt26yrWPda8VGRvnLhHEu-eMB1nvf2VT9smhL9So5JDyx95POWKI0ZDxodX7KYWWICi8/s1600/ECUACI%25C3%2593N+DE+EINSTEIN.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEieJ-GJGIq4bKBObUkzLMbPXBM5GoiQRVSpNRVjvXNlBzhATdS6ybe0hyBqPTEuT8ojKyo5HA8Jt26yrWPda8VGRvnLhHEu-eMB1nvf2VT9smhL9So5JDyx95POWKI0ZDxodX7KYWWICi8/s1600/ECUACI%25C3%2593N+DE+EINSTEIN.jpeg" /></a></div>
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Es evidente que con el
breve resumen anterior no hemos pretendido agotar las implicaciones que para
nuestra reflexión tiene esta teoría. En todo caso sólo hemos destapado
ligeramente el velo de la Teoría de la Relatividad Einsteniana a fin de
entrever algunas de las consecuencias destructoras, que, para nuestras clásicas
nociones de espacio, tiempo, materia y movimiento, comporta. </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><b>a. 2 Consecuencias filosóficas</b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Probablemente una de las
consecuencias más profundas de esa teoría haya que buscarla en la negación del
espacio absoluto sin movimiento de Newton. La física clásica consideraba toda
la historia del mundo físico como una sucesión continua de configuraciones
materiales instantáneas. Cada una de estas configuraciones representa "un
estado del mundo en un instante dado", siendo cada una de estas
configuraciones una "sección transversal instantánea" del proceso
universal espaciotemporal. Puede hablarse del estado presente del Universo en
cada instante porque el concepto de simultaneidad es absoluto.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Hay que hacer la necesaria
consideración de que el descubrimiento de la finitud de la velocidad de la luz
cambió la noción de "ahora visto, ahora existente", pero ello no
modificó la noción fundamental de que para la física clásica <i>"hay
sucesos reales, no sólo en la luna y en la estrella polar, sino también en
todos los cuerpos celestes, que son verdadera y objetivamente simultáneos con
nuestra percepción presente del cielo". </i>Tal noción no puede mantenerse
después de la abolición de la simultaneidad para sucesos separados
espacialmente. Las "secciones transversales instantáneas" son
diferentes para los diferentes sistemas inerciales, el "ahora"
inferido por mí es diferente para otros observadores que se muevan: no existe
un instante cósmico universal y por tanto no puede definirse ningun
"estado presente" absoluto para el universo, no hay un espacio
universal en el que se hallen localizados todos los "sucesos
verdaderamente simultáneos". El espacio-tiempo de la relatividad no es ya
posible concebirlo como una suceslOn continua de espacios instantáneos, de
hecho, como señala Capek, <i>"estos espacios instantáneos no existen
literalmente; o, expresado en lenguaje menos provocativo, se hallan contenidos
en el</i><i><span style="font-family: Arial;"> </span></i><i>continuum espaciotemporal dinámico, del que son
tallados únicamente por medio de operaciones artificiales".</i></span></div>
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjZpxwrpI_-l_Rglb6vMLiA_OOMPLqYXoMdHocwmoZxPrXRBdi-CRmBeNdnXuiZjcUaZQH-x8FUQjYOA32cnE7Qoz_k7JtftoLsLBGAhnszM_KiTgWQiWO9Drlk5iyRSpB9yxWwJOJsSns/s1600/MINKOWSKI.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjZpxwrpI_-l_Rglb6vMLiA_OOMPLqYXoMdHocwmoZxPrXRBdi-CRmBeNdnXuiZjcUaZQH-x8FUQjYOA32cnE7Qoz_k7JtftoLsLBGAhnszM_KiTgWQiWO9Drlk5iyRSpB9yxWwJOJsSns/s1600/MINKOWSKI.jpeg" /></a></div>
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i> </i>Las
palabras de Hermann Minkowski en 1908, a las que Einstein no concedió, en
principio, demasiada atención resultarían proféticas: <i>"Los puntos de
vista sobre el espacio y el tiempo que deseo presentar ante ustedes, brotaron
del seno de la física experimental, y de ahí proviene su solidez. Son
radicales. Desde ahora el espacio en sí y el tiempo en sí estan condenados a
las sombras y sólo una especie de unión de los dos mantendrá una realidad independiente".</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">¿Cuál es <span style="font-family: Arial;">el </span>significado de esta fusión relativista de espacio y tiempo que anuncia
Minkowski pero que ya se halla implícita en las transformaciones de Lorentz?</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">A veces esta fusión es
entendida como una "espacialización del tiempo" probablemente como
consecuencia de las representaciones geométricas (espaciales) que el propio
Minkowski introdujo en el artículo al que hemos hecho referencia con
anterioridad. Hablar de un Universo de cuatro dimensiones y representar el eje
temporal como un eje geométrico adicional induce al equívoco de considerar que
en ese eje los sucesos "pasados", "presentes" y
"futuros" se hallan yuxtapuestos (propiedad esencial del espacio) en
lugar de aparecer en sucesión; eso es lo que parece inferirse de
consideraciones como las que hace Cunnningham en su <i>The Principie of Relativity: Con
Minkowski, el espacio y el tiempo se convierten en aspectos particulares de un
concepto individual de cuatro dimensiones; se pierde la distinción entre ellos
como modos separados de correlacionar los fenómenos, y el movimiento de un
punto en el tiempo se representa mediante una curva estacionario en un espacio
de cuatro dimensiones. Ahora bien, si todos los fenómenos de movimiento son
considerados desde este punto de vista, se hacen fenómenos intemporales en el
espacio de cuatro dimensiones. Toda la historia de un sistema físico queda
planteada como un todo invariable.</i> </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Es cierto que la
simultaneidad y la sucesión aparecen cuestionadas en la teoría de la
relatividad y que en esa línea podríamos aventurar que el tiempo y la sucesión
pierden sus status objetivo, pero, si se profundiza algo más en lo que realmente
afirma la teoría de la relatividad, resulta no ser cierto que la simultaneidad y
la sucesión de sucesos sean pura e ilimitadamente relativas.</span></div>
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<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhkJh4Mf4urVUwRh1LJT7GCNcq62JRoSuYzmOhBmKy3gpYy6_dUC9kNuXead_Va5-3tObsGZZljo1r7o-pAGZaGtD1dlkXR-4D27EG-xG3ZjGVpLdwb-S-jovIFAblSberNfxUD2NmNevU/s1600/dal%25C3%25AD+reloj.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhkJh4Mf4urVUwRh1LJT7GCNcq62JRoSuYzmOhBmKy3gpYy6_dUC9kNuXead_Va5-3tObsGZZljo1r7o-pAGZaGtD1dlkXR-4D27EG-xG3ZjGVpLdwb-S-jovIFAblSberNfxUD2NmNevU/s1600/dal%25C3%25AD+reloj.jpeg" /></a></div>
<br /></div>
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<span style="font-size: small;">Puede verse con facilidad
que a) la simultaneidad y la sucesión de sucesos que se producen en el mismo
lugar siguen manteniéndose para cualquier observador concebible, b) lo que sí
es plenamente relativo es la simultaneidad de sucesos espacialmente separados
o, expresado de otro modo, la yuxtaposición es relativa y c) la sucesión de
sucesos distantes no es relativa si esos sucesos están conectados causalmente,
sí lo es si tal conexión causal no puede establecerse porque su separación
espacial es mayor que el producto de la velocidad de la luz por el intervalo
temporal.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Concluiríamos del análisis
precedente que <i>"aunque no hay yuxtaposición de sucesos que sea
yuxtaposición para todos los observadores (espacialidad absoluta), hay ciertos
tipos de sucesión que lo siguen siendo en todos los sistemas de referencia y a
ellos hay que atribuirles una auténtica y objetiva realidad independiente de la
elección convencional del sistema de referencia (temporalidad absoluta)". </i></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La noción de espacio (en el
sentido clásico del término) se ve así más seriamente cuestionada que la noción
de tiempo de tal modo que, parafraseando a Whitehead, <i>"las relaciones
espaciales deben extenderse a través del tiempo" pues "lo que
llamamos distancia ya no es la relación entre "aquí-ahora" y
"allí-ahora" sino entre "aquí-ahora" y
"allí-entonces".</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Este cuestionamiento de las
nociones, no sólo espaciales y temporales sino también las que se refieren a la
materia, del universo clasico se hace aún más radical en la Teoría General de
la Relatividad cuando recordamos que entre las propiedades del espacio clásico se
encontraba la de ser "receptáculo de la materia e independiente de ella y
de sus cambios" y que en esta nueva concepción, como ya indicamos en el
epígrafe anterior, <i>"la materia y la curvatura local del espacio son una
sola e idéntica realidad". </i>La distinción e independencia entre espacio,
tiempo y distribución cambiante de materia se ve negada y todas estas entidades
aparecen, en la Relatividad General, fusionados en una realidad dinámica nueva:
el continuum no euclidiano con curvatura espacio-temporal que varía de un punto
a otro.</span></div>
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<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEibzSLO2b2BHUFM55D_6o4Y6axGu6xn5MzePgc4TPS_LdNk2Mk2iawyRropCq3rDjE_kHa0NlA_vcxRiRLhaJMDruUZW9lUabY05jAarXdENKbzJI-9toSxhcTtNdEJBeJ96KESrWYVZoU/s1600/CURVATURA.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEibzSLO2b2BHUFM55D_6o4Y6axGu6xn5MzePgc4TPS_LdNk2Mk2iawyRropCq3rDjE_kHa0NlA_vcxRiRLhaJMDruUZW9lUabY05jAarXdENKbzJI-9toSxhcTtNdEJBeJ96KESrWYVZoU/s1600/CURVATURA.jpeg" /></a></div>
<br /></div>
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<span style="font-size: small;">¿Qué sentido tiene ya
hablar de masa, de corpúsculos, cuando esta masa ha perdido su persistencia y
ya no es posible mantener su conservación al aparecer disuelta en una nueva
entidad de la que forma parte su contenido energético? ¿Y qué decir de este
concepto cuando ya <span style="font-family: Arial;">ni </span>siquiera podemos hablar de la masa como separada del
espacio en la que se mueve sino, utilizando la expresión de Emile Meyerson,
como <i>"reabsorbida en el espacio (espacio-tiempo)"?</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Al mismo tiempo, poco queda
ya del concepto clásico del movimiento en el que se hacía uso tanto del <i>"sujeto
invariable de movimiento como del recipiente invariable del mismo". </i>Ni
uno sólo de los conceptos que apoyaban esa noción clásica queda en pié
(entidades corpusculares sustanciales, espacio en el que se despliega el
movimiento, tiempo como receptáculo de los cambios, continuidad espaciotemporal
que se deduce de la homogeneidad de ambos, relación externa entre movimiento y
materia) </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Los atributos básicos del
modelo pictórico clásico han quedado difuminados y no han resistido la radical
crítica de las teorías especial y general de la Relatividad. </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El asalto cuántico aún hizo
más profunda esa destrucción.</span></div>
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<br /></div>
miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-14756077181643296942011-09-20T19:04:00.000+01:002011-09-20T19:04:17.758+01:00LA CRISIS DE LA FÍSICA CLÁSICA: OTRA FORMA DE VER EL MUNDO (I)<!--[if gte mso 9]><xml>
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<br /></div>
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<br /></div>
<div align="right" class="MsoNormal" style="text-align: right;">
<span style="font-size: small;"><i><span>¡No se puede
conocer a alguien a la luz de la</span></i></span></div>
<div align="right" class="MsoNormal" style="text-align: right;">
<span style="font-size: small;"><i><span>justicia y a la luz
del amor al mismo tiempo!</span></i></span></div>
<div align="right" class="MsoNormal" style="text-align: right;">
<span style="font-size: small;"><i><span>Bohr</span></i></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>Aquella tarde
Heisenberg no pudo "resistir más la presión a que lo sometía Bohr y rompió
a llorar"</span><span style="font-family: Arial;">; </span><span>probablemente por su mente pasarían las imágenes, no
tan lejanas en el tiempo, de un Schrödinger enfermo perseguido por el
implacable danés. El motivo de la discusión, dura y muy desagradable, no era
otro que la interpretación de lo que luego pasaría a denominarse <i>Principio de
Indeterminación</i>.</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiTqq1uaf6PbiO-olSpJpFE-F8zpT2gOUNHe644CtbnGLt0wq9wrPO4rsbs-CyY5FAP0Rk7zEVpa-qPIfXr8TOGjqZWCVGFBoixZih-geRwl-b9Ef6risQY0jQGIwk1FE1Lx2bPYLfPnH4/s1600/bohrheisenberg.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiTqq1uaf6PbiO-olSpJpFE-F8zpT2gOUNHe644CtbnGLt0wq9wrPO4rsbs-CyY5FAP0Rk7zEVpa-qPIfXr8TOGjqZWCVGFBoixZih-geRwl-b9Ef6risQY0jQGIwk1FE1Lx2bPYLfPnH4/s320/bohrheisenberg.jpg" width="320" /></a></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>El origen inmediato de
la disputa había que buscarlo en el desafío que, para los cuánticos de la
escuela de Bohr, había supuesto la formulación de la Mecánica Ondulatoria de Schrödinger
y la prueba de equivalencia matemática entre este formalismo y el de la
Mecánica de Matrices; y las razones de su carácter violento, en la importancia
del asunto que estaba en juego: la naturaleza de lo real, la conformación de
una "radical y nueva manera de ver el mundo".</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>Antes de que pasemos a
exponer al lector los contrapuestos puntos de vista sostenidos por Heisenberg y
Bohr, quizás convendría ponerlo en antecedentes sobre algunos de los hechos más
significativos, tanto de esta accidentada y extraña historia de "los
cuantos" como de la época en la que se gestó un cambio radical en ciencia,
<i>–</i>del que la discusión que relatamos formó parte. </span></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: center;">
<span style="font-size: small;"><b><span>ANTECEDENTES</span></b></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg75TNHzOUaajNNt-Tm5gZLGBXk3KaJwJmcOvSE_pEIA9qkpO2hLoVtAF8wZPUbP3WImz4C1PVywm6Myy_ffuNj6JHyWOW2BoKCCzrCHF6zKotxHqfy2NW-mFFdVcx7Z_xQEsZ14DwurbI/s1600/PLANCK.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg75TNHzOUaajNNt-Tm5gZLGBXk3KaJwJmcOvSE_pEIA9qkpO2hLoVtAF8wZPUbP3WImz4C1PVywm6Myy_ffuNj6JHyWOW2BoKCCzrCHF6zKotxHqfy2NW-mFFdVcx7Z_xQEsZ14DwurbI/s1600/PLANCK.jpeg" /></a></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>Los inicios del siglo
XX contemplaron cómo Max Planck, un afamado físico al que no cabe catalogar
como rupturista, se veía obligado a introducir una suposición de consecuencias
imprevisibles (los intercambios energéticos entre materia y</span><span style="font-family: Arial;"> </span><span>radiación
se producen en "cuantos", en paquetes discretos) a fin de obtener una
expresión matemática mediante la que se diera cuenta de la forma de la curva de
radiación espectral del"cuerpo negro". Poco después, en 1905, un
oscuro funcionario de una oficina de patentes en Berna, de nombre Albert
Einstein, publicaba tres artículos de contenido variado ( movimiento browniano,
efecto fotoeléctrico y teoría especial de la Relatividad) pero de enorme
influencia en el desarrollo posterior de la Física.</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>Todo ello ocurría
sobre un trasfondo de inquietud socio política que repercutía en todos los
aspectos oe la actividad humana y que, sin duda, anunciaba una nueva época.</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>En 1902 un
revolucionario profesional, Vladimir Ilich Ulyanov "Lenin" publicaba
un libro de título <i>"¿Qué hacer?", </i>en el que teorizaba sobre la
necesidad de crear un partido que se convirtiera en la <i>"vanguardia del
proletariado".</i></span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>En 1905 estallaba en
Rusia una revolución que, aunque fallida, mostraba claramente la inestabilidad
de un orden que hacía aguas por todas partes.</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>En 1911 el físico
neozelandés Ernest Rutherford, después del análisis de los experimentos de
deflexión de partículas a de velocidades elevadas por láminas delgadas de oro,
dió a la luz su modelo nuclear y planetario para el átomo. Atraido por la
efervescencia y la actividad científica del Cavendish Laboratory llega a
Cambridge el danés Niels Bohr quien en tres artículos publicados los años 1913,
1914 Y 1915 en la <i>Philosofical Magazine</i>
introduce en un sustrato clásico, de modo audaz, hipótesis de cuantificación en
el átomo a fin de "dar cuenta" del misterioso comportamiento de las
líneas espectrales. Sonmerfeld generaliza, durante los años 1915 y 16, el
modelo de Bohr para el átomo de Hidrógeno extendiendo las condiciones de
cuantificación a sistemas periódicos con más grados de libertad y dando cuenta
así de la estructura fina de las líneas espectrales. La "vieja mecánica
cuántica" está prácticamente concluida <span> </span>(la distinción básica entre la "vieja
mecánica cuántica" y las nuevas ideas que introducirá Heisenberg hay que
buscarla en la transición desde modelos mecánicos del átomo, <i>–</i>aunque
sean simbólicos<i>–</i>, a observables de laboratorio como fundamento de la
teoría).</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span><span> </span>.</span></span></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>En 1914 se inicia la La
Guerra Mundial y una profunda oleada de nacionalismo anega Europa. Las
organizaciones socialistas se alinean con sus respectivos gobiernos a pesar de
sus previas proclamas internacionalistas y antiimperialistas.</span></span></div>
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<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhGfQiy_lE-gbLRG-TtRym7tdBndRw375JjzBI8AilNmJ0lqRR02v1zU7SOcY5lZXZ5c7LqwvYWRnT6l_eE45BxyTiiw9lWeqKvuEp6r4wxmkeJXRFWzX6KmV7DXPM2ie3kosBRiXLa2QE/s1600/PRIMERA+GUERRA.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhGfQiy_lE-gbLRG-TtRym7tdBndRw375JjzBI8AilNmJ0lqRR02v1zU7SOcY5lZXZ5c7LqwvYWRnT6l_eE45BxyTiiw9lWeqKvuEp6r4wxmkeJXRFWzX6KmV7DXPM2ie3kosBRiXLa2QE/s1600/PRIMERA+GUERRA.jpeg" /></a></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify; text-indent: 35.4pt;">
<span style="font-size: small;"><span>Lenin clama por la
constitución de una Tercera Internacional que declare <i>"muerta la Segunda,
traidores a los socialistas pertenecientes a ella" </i>y propone como
tarea inmediata de los verdaderos revolucionarios <i>"la transformación de
la guerra imperialista en guerra civil". </i>En 1917 explica, en <i>El
imperialismo, fase superior del capitalismo, </i>su punto de vista sobre el
carácter y las causas de la Gran Guerra, las razones del abandono del
internacionalismo por los socialistas y el modo en cómo acabar con aquélla por
medio de la revolución. Revolución que estalla en Rusia en Octubre de ese mismo
año y que acaba con el zarismo.</span></span></div>
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<span style="font-size: small;"><span>En 1918 tiene lugar la
disolución de la monarquía de los Hausburgo y el desmembramiento del imperio
austro-húngaro, la flota alemana se niega a zarpar de Kiel, los marineros
enarbolan e izan banderas rojas y se extienden por todo el país los consejos de
trabajadores y soldados. El Kaiser abdica y huye a<span> </span>Holanda, el 9 de noviembre los ministros
socialdemócratas proclaman la República, se constituye un nuevo gobierno y el
11 del mismo mes se firma el armisticio que, ratificado posteriormente, en
Junio de 1919, en el Tratado de Versalles, impone duras compensaciones a los
países derrotados. Los brotes revolucionarios son sofocados con dureza (Rosa
Luxenburgo y Karl Liebknecht son asesinados en Alemania en enero de 1919) y se
fomenta la contrarrevolución y la guerra civil en una Rusia sometida a cerco.
El miedo al socialismo se extiende por toda Europa, las masas adquieren
protagonismo creciente y el "orden burgués" se ve amenazado.</span></span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgkpNy-joMQEsg7InXWDcaU2nRDQCqBkjeq2PljdyL2XSm-f1X0huZJUf4OKbVM8GiycGtnvIJ46vNSYmnTsg2j1u81jw_9Tr6-BOjIuivDN_pxHMHhpqfcTRSnkiic8Hw3-z_aZ0oTV7c/s1600/ROSA+LUXEMBURGO.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgkpNy-joMQEsg7InXWDcaU2nRDQCqBkjeq2PljdyL2XSm-f1X0huZJUf4OKbVM8GiycGtnvIJ46vNSYmnTsg2j1u81jw_9Tr6-BOjIuivDN_pxHMHhpqfcTRSnkiic8Hw3-z_aZ0oTV7c/s1600/ROSA+LUXEMBURGO.jpeg" /></a></div>
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<span style="font-size: small;"><span>Todo parece posible y
todo parece acabado como bien describe el libro de Joseph Roth <i>"La marcha de Radetzky": <span> </span>"En aquel entonces, antes de la Gran
Guerra,... no era aún indiferente que alguien muriera o viviera. No se
encontraba fácilmente un sustituto para el que desaparecía del mundo de los
vivos, ni se olvidaba al muerto para ocupar su lugar, sino que durante mucho
tiempo se hacía notar el vacío por él dejado, y tanto los inmediatos como los
lejanos testigos de su muerte, enmudecían al advertirlo... Todo cuanto crecía
necesitaba mucho tiempo para terminarse; todo cuanto desaparecía necesitaba
mucho tiempo para ser olvidado, Cuando una vez había existido, dejaba siempre
rastros de su presencia, y se vivía de recuerdos, de la misma manera que en los
tiempos actuales se vive de la facultad de olvidar".</i></span></span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjMo-U85ITfRGLp3aAwGurCL2hJlkpzAwFKqG2qowg-aY4vEST_72t0tIhMU0rs3Mcq6Crd8fWYldjltMyc11S-VoKn2daWE11EQ4tkMTw9lv3Wj9fioeB3Tex-2QYCHMIsUGKLY8xy0qg/s1600/GerArmyMutinies%252CWarEnds.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="198" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjMo-U85ITfRGLp3aAwGurCL2hJlkpzAwFKqG2qowg-aY4vEST_72t0tIhMU0rs3Mcq6Crd8fWYldjltMyc11S-VoKn2daWE11EQ4tkMTw9lv3Wj9fioeB3Tex-2QYCHMIsUGKLY8xy0qg/s320/GerArmyMutinies%252CWarEnds.jpg" width="320" /></a></div>
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<span style="font-size: small;"><span>No es extraño pues que
se produzca una eclosión total en casi todos los ámbitos y que esta época
aparezca simultáneamente como el crisol de las vanguardias más rupturistas y de
los movimientos políticos más reaccionarios, que en ella coexista la ciencia
más audaz y creativa con las más variadas y diversas pseudociencias y que se
proclame al mismo tiempo, desde el ámbito de la filosofía, su propia
reconstrucción "al modo de la ciencia" o, por el contrario, su despliegue
como negación de ésta.</span></span></div>
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<br /></div>
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<span style="font-size: small;"><span>Parecía llegado el
momento de pasar revista a un entramado de valores, conceptos, etc., en suma, a
una cultura (de la que la ciencia forma parte esencial) que, incapaz de
culminar expectativas, había arrojado a los pueblos a la barbarie y que ya no
era de "estos tiempos".</span></span></div>
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<br /></div>
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<span style="font-size: small;"><span>Después de apuntado,
en forma sumaria, el "tono de la época", vamos a restringir, aún más,
nuestro análisis al campo de la ciencia y a rastrear en qué medida y por qué
razones (o sinrazones) se cuestionó de un modo radical el modelo clásico de
ciencia. Nuestro estudio será esencialmente "internalista" aunque admitamos
la posible influencia, en el discurso, las interpretaciones, etc., de la
ciencia física, de todo lo que Forman denomina <i>"el ambiente intelectual
de la época de Weimar: antirracionalista, de exaltación de la lebensphilosophie
(filosofía de la vida) y de rechazo del positivismo, mecanicismo y materialismo
encarnados en la noción de causalidad". </i> </span></span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEie3_WVlTwOT1mJ6mBSngPsDDxMhsRxqm6pjtn_qYiaNdqjhstYbws9JDSBb8b6bme2P_yOkMoh01QQ5dsGpS1nGDGCmA5Tt7x1Jnsm1skWUWp9EkRMkj5eIpuriCJ7eFFANoapd6P98FQ/s1600/SPENGLER.jpeg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEie3_WVlTwOT1mJ6mBSngPsDDxMhsRxqm6pjtn_qYiaNdqjhstYbws9JDSBb8b6bme2P_yOkMoh01QQ5dsGpS1nGDGCmA5Tt7x1Jnsm1skWUWp9EkRMkj5eIpuriCJ7eFFANoapd6P98FQ/s1600/SPENGLER.jpeg" /></a><span style="font-size: small;"><span> </span></span></div>
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<span style="font-size: small;"><span><br /></span></span></div>
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<span style="font-size: small;"><span>La influencia del libro de
Spengler <i>"La</i></span><i><span style="font-family: Arial;"> </span></i><i><span>decadencia de
Occidente", </span></i><span>donde, desde una
concepción cuasi biológica de "las épocas culturales", se proclama la
consunción y la vejez de la nuestra, resulta paradigmática <i>– </i><i>"Uno también está cansado de tener
solamente interrelaciones de causa y efecto demostradas una y otra vez de
acuerdo a los métodos de conocimiento racionales, y cansado de efectuar tales
demostraciones uno mismo; soy de la opinión de que en la humanidad y en la vida
existe mucho más que un aparato de causalidad mecánica. Uno se ha cansado de
conocer y está sediento de vivir”<span>–</span>.</i></span></span></div>
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<b><span style="font-size: small;"><span>LA</span><span> VISIÓN
CLÁSICA DEL MUNDO</span></span></b></div>
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<span style="font-size: small;"><span>Hasta el advenimiento
de la Teoría de la Relatividad y la Física Cuántica, la visión mecánica de
Newton complementada con la teoría del campo electromagnética de
Faraday-Maxwell dominaba <i>– </i>pese a críticas más o menos atinadas pero
puntuales<i>– </i>el escenario de la ciencia física y mediante su amalgama se
"explicaba el mundo real".</span></span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgceKmkPo8PGqB73530fOnvIszSSlfUjTfyFlgKZBwmTTVRhmPMJ_5TKQ3LVlUMd1HE7OiJZdhG__TvE4U0Z-03d51_3Sl_ayKcaAXze5M4yLGIYlksGO20e4k8W285Jy3Ta133bOQqVR8/s1600/20080313-newton1689.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgceKmkPo8PGqB73530fOnvIszSSlfUjTfyFlgKZBwmTTVRhmPMJ_5TKQ3LVlUMd1HE7OiJZdhG__TvE4U0Z-03d51_3Sl_ayKcaAXze5M4yLGIYlksGO20e4k8W285Jy3Ta133bOQqVR8/s320/20080313-newton1689.jpg" width="263" /></a></div>
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<span style="font-size: small;"><span>Los presupuestos sobre
los que descansaba esta visión del mundo podrían resumirse del modo siguiente:</span></span></div>
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<span style="font-size: small;"><span> </span></span></div>
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<span style="font-size: small;"><span>1.- La materia, que es
discontinua en su estructura, se mueve a través del espacio según las leyes
estrictas de la mecánica.</span></span></div>
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<span style="font-size: small;"><span>2.- Todas las diferencias
aparentemente cualitativas de la naturaleza se deben a las diferencias de
configuración o movimiento de estas unidades básicas o de sus agregados.</span></span></div>
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<span style="font-size: small;"><span>3.- Todos los cambios
aparentemente cualitativos son meramente efectos superficiales del
desplazamiento de las unidades elementales o de sus agregados.</span></span></div>
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<span style="font-size: small;"><span>4.- Toda acción recíproca
entre los corpúsculos básicos se debe exclusivamente a su impacto directo
entendido éste si no entre cuerpos macroscópicos, al menos entre las partículas
elementales del medio intermedio (el éter electromagnético de Maxwell es una de
sus elaboraciones más sofisticadas pero sus antecedentes se remontan a
Descartes entre otros). La acción a distancia es pues una simple figura de
dicción De hecho, cuando el vínculo material directo entre los cuerpos
distantes que actúan recíprocamente parecía estar ausente, la imaginación de
los filósofos y los científicos lo proporcionó en forma de un agente mecánico
intermedio que se compone de partículas demasiado sutiles para ser percibidas
por los sentidos humanos. </span></span></div>
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<span style="font-size: small;"><span>5.- La variedad
cualitativa, así como la transformación cualitativa, son adiciones psíquicas de
la mente humana perceptora. No pertenecen, en consecuencia, a la naturaleza de
las cosas.</span></span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhWKrUoMCzdKdRp6Jxhda5BcHQNUklpKye1ctcBlGFr7F6utEsJGEwGySm21zbGOd6jBALJ_25ZZvGhyphenhyphenalBLhHmt-Dzs52ZFMV9zuhyphenhyphencHWS9z8ThfIzFN7ekNEAZSaKysplvdRMutxMEUE/s1600/maxwell.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhWKrUoMCzdKdRp6Jxhda5BcHQNUklpKye1ctcBlGFr7F6utEsJGEwGySm21zbGOd6jBALJ_25ZZvGhyphenhyphenalBLhHmt-Dzs52ZFMV9zuhyphenhyphencHWS9z8ThfIzFN7ekNEAZSaKysplvdRMutxMEUE/s320/maxwell.jpg" width="245" /></a></div>
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<span style="font-size: small;"><span>Conviene hacer algunas
precisiones sobre el conjunto de presupuestos anteriores a fin de aislar los
conceptos y nociones esenciales que subyacen en lo que Millic Capek denomina,
"</span></span><span style="font-size: small;"><span><i> </i></span></span><span style="font-size: small;"><span>por propia elección de la palabra", <i>cuadro clásico </i>a fin de
remarcar su carácter pictórico. "Pregunta a tu imaginación si la quiere
aceptar" afirmaba John Tyndall en su alocución de Liverpool a los físicos
de la era victoriana como criterio fidedigno de las teorías científicas
satisfactorias, o sea, pregúntate a tí</span><span style="font-family: Arial;"> </span><span>mismo si puedes
dibujar un cuadro mental del fenómeno en cuestión; recházalo si no se puede
construir un diagrama visual, un modelo mecánico.</span></span></div>
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<span style="font-size: small;"><span>Encontramos en este
cuadro clásico los conceptos de espacio, tiempo, materia, movimiento y
causalidad y, aunque cada uno de ellos exigiría un tratado, vamos a intentar
señalar de qué modo son concebidos en esta visión del mundo.</span></span></div>
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<span style="font-size: small;"><span>Añadiríamos además
para completar el panorama, que en Física clásica existe, de acuerdo con el más
elemental sentido común, un mundo objetivo "ahí fuera".</span></span></div>
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<span style="font-size: small;"><span>Un mundo que
evoluciona de un modo claro y determinista, gobernado por leyes formuladas
exactamente mediante ecuaciones diferenciales. La realidad física existe, pues,
independientemente de nosotros mismos y el modo exacto de "ser" del
mundo no está afectado por cómo decidimos observarlo. Nuestros cuerpos y nuestros
cerebros van a ser ellos mismos parte de este mundo y están, por tanto, sometidos
a evolución en términos de las mismas ecuaciones clásicas exactas y deterministas.</span></span></div>
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<span style="font-size: small;"><b><span>A) El concepto de
espacio</span></b></span></div>
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<br /></div>
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<span style="font-size: small;"><span>Newton formulaba su
noción de espacio en los siguientes términos: <i>"El espacio absoluto, en
su propia naturaleza, sin consideración hacia ninguna cosa externa, permanece
siempre similar e inmóvil". </i>Este concepto ya se hallaba prefigurado en
el viejo atomismo de Leucipo y Demócrito donde se había establecido por primera
vez la distinción explícita entre la materia definida como plenum o espacio
ocupado en franco contraste con el vacío o espacio desocupado.</span></span></div>
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<span style="font-size: small;"><span>El Universo quedó
configurado desde entonces, en términos de un recipiente inmutable e
independiente y de un contenido físico, material, variable <i>("sólo existen
los átomos y el vacío y aquellos se mueven en éste"). </i>Nunca se enfatizará
suficientemente el poder de la concepción atomista, su capacidad explicativa. Como
bien dice Feynmann: <i>"Si en algún
cataclismo fuera destruido todo el conocimiento científico y solamente pasara
una frase a la generación siguiente de criaturas. ¿qué enunciado contendría el
máximo de información en el mínimo número de palabras? Yo creo que sería la
hipótesis atómica: que todas las cosas están formadas por átomos,- pequeñas
partículas que se mueven con movimiento perpetuo, atrayéndose unas a otras cuando
están separadas por una pequeña distancia, pero repeliéndose cuando se las
trata de apretar una contra otra"</i>. </span></span></div>
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<span style="font-size: small;"><span>El tema de la
precedencia temporal y lógica del espacio sobre la materia aparece
repetidamente en la reflexión de filósofos y poetas, la nada parece ser autosuficiente
y autoafirmativa, en tanto que el Ser parece requerir una razón suficiente para
su propia presencia<i>. "...La
existencia me parece como una conquista sobre la nada. Me digo que puede
existir la nada, que realmente debe existir, y entonces sospecho que existe
algo. O me imagino toda la realidad extendida sobre la nada como sobre una
alfombra: al principio era la nada, y el ser fue sobreañadido después"</i>
escribirá Bergson en 1907. Paul Valery lo expresará de un modo poético: <i>"Que l'universe n-est que un defaut
dans la pureté du Non-Etre!"</i> y Heidegger lo dramatizará mediante su
aforismo existencial: <i>¿Por qué existe
cualquier ser y no precisamente la nada?</i></span></span></div>
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<span style="font-size: small;"><span>El espacio atomista es
homogéneo y de esta homogeneidad se derivan sus propiedades esenciales:
independencia, inmutabilidad, infinidad, continuidad matemática, inacción
causal. Toda heterogeneidad hay que buscarla en la materia que ocupa el espacio
y que se desplaza en él. Al espacio sólo pertenecen las relaciones de
yuxtaposición, o como Locke lo expresaba: <i>el espacio es el principium individuationis,
que nos permite distinguir dos sensaciones simultáneas cualitativamnete
idénticas, dos objetos simultáneamente percibidos sólo pueden ser numericamente
distintos si están en dos lugares diferentes". </i>Todas las posiciones en
el espacio son cualitativamente idénticas, su única distinción se debe a sus
relaciones de yuxtaposición o coexistencia. Bergson lo expresará así: <i>el espacio es lo que nos permite distinguir unas
de otras un número de sensaciones idénticas y simultáneas, es así un principio
de diferenciación distinto al de diferenciación cualitativa, y, por
consiguiente, es una realidad sin ninguna cualidad </i><span> </span>y Bertrand Russell de este modo: <i>Todos los puntos son cualitativamente
similares, y se distinguen por el mero hecho de estar situados unos fuera de
otros. </i></span></span></div>
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<span style="font-size: small;"><span>Ya en ocasiones
anteriores hemos argumentado en favor de la relación entre este espacio físico
atomista y el espacio abstracto de la geometría griega (el espacio de
Euclides), por lo que aquí nos limitamos a recordar que, pese a la aceptación
del espacio heterogéneo de Aristóteles como el espacio de lo físico (impelidos
sin duda por la necesidad de explicar el orden en términos de finalidad, de
diseño), siempre que se matematizó el mundo natural (en Astronomía con
Aristarco, en Mecánica con Arquímedes, etc.) se trató el espacio físico
"al modo atomista". </span></span></div>
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<br /></div>
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<span style="font-size: small;"><span>Esta argumentación,
que podría ser discutible en el ámbito de la ciencia griega, resulta
incontrovertible cuando nos referimos a la ciencia de Newton: la geometrización
y aritmetización del espacio físico resulta ser una consecuencia lógica de la
algebrización de la geometría que Descartes y Fermat materializaron en el siglo
XVII. Existe una identificación indiscutible entre el espacio euclídeo y el
espacio del mundo de los procesos físicos. La geometría de Euclides y la mecánica
de Newton se basan ámbas en hábitos profundamente arraigados de la imaginación
y el pensamiento cuya fuerza es mucho mayor de lo que generalmente nos hallamos
dispuestos a reconocer. </span></span></div>
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<span style="font-size: small;"><span>A Kant le impresionaba tanto esta fuerza que la
consideraba como manifestación de la estructura a priori inmutable de la mente
humana; Herbert Spencer, a pesar de su epistemología radicalmente distinta,
coincidía finalmente con Kant, al menos en cuanto a la inmutabilidad de la
estructura intelectual de Newton y Euclides. Esta estructura sería, según
Spencer, el resultado final y definitivo de un largo proceso de ajuste en el
que el mundo externo creó, por decirlo así, su réplica exacta en la mente
humana en forma de la imagen de la naturaleza que contemplaban Euclides y Newton...
: la ciencia clásica era considerada como ajuste final y completo de las
facultades cognoscitivas humanas al orden objetivo de las cosas.</span></span></div>
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<span style="font-size: small;"><span>Identificación que
sólo más tarde se volverá problemática cuando se descubran las geometrías no-euclídeas
y se suscite la cuestión de cual, de los ahora diversos espacios matemáticos,
corresponde al espacio real de la física.</span></span></div>
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<span style="font-size: small;"><b><span>B) El concepto de tiempo</span></b></span></div>
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<span style="font-size: small;"><span>También podemos
utilizar la formulación newtoniona como eje de nuestra reflexión sobre la idea
de tiempo en la física clásica: <i>"El tiempo verdadero y matemático absoluto,
de por sí y por su propia naturaleza, fluye uniformemente, sin consideración a
ninguna cosa externa. También se llama duración. El tiempo rela tivo, aparente
y vulgar es cierta sensible y externa medida del tiempo absoluto, estimadt? por
los movimientos de los cuerpos, ya exacta o desigual, y comúnmente se utiliza
en vez del tiempo verdadero (tal como una hora, un día, un mes, etc.)".</i></span></span></div>
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<span style="font-size: small;"><span>El tiempo, al igual
que sucedía con el espacio en otra forma, fluye, cambie o nó alguna cosa; los
cambios están en el tiempo pero no son el tiempo. Si la relación esencial del
espacio era la yuxtaposición, la relación básica en el tiempo es la sucesión.
Es ésta relación de sucesión la que hace posible distinguir dos estados
cualitativamente idénticos de una sóla e idéntica entidad. Se trata pues, al
igual que el espacio, de un principio de diferenciación de un género distinto al
cualitativo.</span></span></div>
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<span style="font-size: small;"><span>La homogeneidad del
tiempo, conectada con el flujo uniforme, implica para éste unas propiedades de
tipo similar a las que ya hemos comentado en relación a la homogeneidad del
espacio: independencia, infinidad, continuidad matemática e inacción causal.</span></span></div>
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<span style="font-size: small;"><span>El tiempo, al igual
que el espacio es recipiente de toda la materia, es receptáculo de todos los
cambios e incluso, como señaló Whitehead, </span><i><span style="font-family: Arial;">"el </span></i><i><span>tiempo
es receptáculo no sólo del material físico variable sino también del propio
espacio</span></i><span>". El espacio no es
realmente intemporal y más que hablar de un espacio que subsiste ajeno al
tiempo tenemos que hablar de una serie infinita de espacios instantáneos sucesivos
que, aunque cualitativamente idénticos, aún difieren por sus posiciones en el
curso universal e inexorable del tiempo.</span></span></div>
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<span style="font-size: small;"><span>C) <b>El concepto de
materia</b></span></span></div>
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<span style="font-size: small;"><span>Desde los lejanos
tiempos de Leucipo y Demócrito la noción de materia se nos representa como
negación de la Nada y a sus elementos constitutivos, los átomos, les atribuimos
la propiedad esencial de "llenar espacio". Éste ser "espacio lleno"
los dota de propiedades de impenetrabilidad, indestructibilidad, rigidez y
homogeneidad.</span></span></div>
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<span style="font-size: small;"><span>La historia de la
"hipótesis atómica" muestra como una y otra vez la negación práctica
de alguna de las propiedades antes enumeradas en los, hasta ese momento considerados,
elementos últimos, obligó a buscar en un nivel más profundo unidades más
pequeñas y básicas en las que esos rasgos esenciales volvieran a recuperarse.</span></span></div>
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<span style="font-size: small;"><span>Se aceptaba lo que ha
venido a denominarse "el tema de Gulliver": <i>"De esta manera, observan los naturalistas que una pulga tiene
pequeñas pulgas que en ella hacen presa; y éstas tienen otras más pequeñas
todavía que las pican, y así proceden ad infinitum"</i> </span></span></div>
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<span style="font-size: small;"><span>Este atomismo
"radical y esencial" adquirió su expresión más acabada, nó en el
modelo de Dalton que contemplaba la existencia de átomos con propiedades cualitativamente
diferentes, sino en la teoría del electrón que aparentemente consiguió reducir,
en línea con los postulados del atomismo filosófico, casi todas las diferencias
cualitativas de la naturaleza a diferencias de complejidad y agregación de los
corpúsculos básicos homogéneos: los átomos de electricidad. A finales del siglo
XIX e incluso a principios del XX se soñaba con cubrir, en un nivel más
profundo (el de la omnímoda unidad del éter), los huecos que aún persistían en
el cuadro mecánico del mundo: la dualidad de materia y electricidad, así como
la doble polaridad (cargas </span><span style="font-family: Arial;">+ </span><span>y -) de ésta. Este concepto de
"éter" tiene también una larga historia en la que no vamos a
detenernos. Mencionaremos aquí que, en nuestro contexto y bajo el ropaje del éter
electromagnético de Maxwell, sirvió como medio que garantizaba la acción recíproca
por contacto entre cuerpos distantes y que, en desarrollos posteriores o
colaterales, se pretendió utilizarlo como sustrato desde el que sería
explicable no sólo la acción recíproca entre los propios cuerpos sino también
la propia individualidad de las partículas básicas.</span></span></div>
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<span style="font-size: small;"><span>D)</span><span style="font-family: Arial;"> </span><b><span>El concepto de movimiento</span></b></span></div>
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<span style="font-size: small;"><span>Los viejos atomistas
reconocieron que el movimiento no se podía derivar de la materia y tampoco del
espacio o el tiempo (cuya inacción causal ya hemos mencionado) y, aunque estas
ideas fueron reformuladas con posterioridad de un modo más elaborado, en su
modelo prefiguraron, de un modo implícito, tanto la ley de conservación de la
masa como la de conservación del movimiento al conceptuar a la materia y al
movimiento como <i>"cantidades sustanciales que se conservan a través del
tiempo, mientras cambia su distribución espacial"</i></span></span></div>
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<span style="font-size: small;"><span>Leibniz lo expresaba así<i>: </i></span><i><span>"Puesto que el cuerpo no es nada
más que materia y figura y puesto que la causa del movimiento no se puede
comprender a base de materia o figura, la causa del movimiento debe estar
necesariamente fuera del cuerpo"</span></i><span>
y Locke de este modo: <i>"Supongamos
eterno, grande o pequeño, cualquier paquete de materia; no lo encontraremos en
sí capaz de producir nada... ; si no hubiese otro ser en el mundo, ¿no debe
permanecer eternamente así, terrón muerto e inactivo? ¿Es posible concebir que
puede añadir movimiento a sí mismo, siendo pura materia, o producir cualquier
otra cosa? La materia, pues, por su propia fuerza no puede producir nada; el
movimiento que tiene también debe proceder de la eternidad, o, si no, ser
producido o añadido por algún ser más poderoso que la materia” <span>.</span></i></span></span></div>
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<span style="font-size: small;"><span>La formulación
explícita de estas leyes tuvo que esperar al siglo XVIII (Lavoisier y Huygens)
y en ese largo camino se tuvo que destruir un prejuicio profundamente asentado
-"el principio de conservación del lugar" íntimamente conectado con
la falsa idea de que "todo movimiento necesita un motor"-, y sus tituirlo
por la ley de inercia donde existe movimiento en ausencia de </span><span>fuerza</span><span> y en el que se le da sustancialidad a aquél.</span></span></div>
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<span style="font-size: small;"><span>Las leyes de conservación en sus diversas
manifestaciones (momento, energía, masa, etc.) son variaciones de un mismo
tema: <i>"los sucesivos estados del Universo son simples redistribuciones
espaciales de cantidades sustanciales que en conjunto son constantes". </i>Estos
estados sucesivos están, además, prefigurados en los estados anteriores y, dada
la supuesta finitud de los elementos constitutivos del Universo, no sólo no
está excluida la posibilidad de un retorno cíclico sino que tal retorno aparece
como inexorable. </span></span></div>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEixqC4d3OymdSzLw7NV84i4VK9e5bIXblVBfWp1jisalkdKPS7tC1y6nknpig_k5WyXos1lVzMJj4ZKE9kFixSLdxEiM-rK2s9E745vkQjTdgNWyCE9cajGSpdNY_ARdUB0oyKRChvy8eE/s1600/nietzche.jpeg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEixqC4d3OymdSzLw7NV84i4VK9e5bIXblVBfWp1jisalkdKPS7tC1y6nknpig_k5WyXos1lVzMJj4ZKE9kFixSLdxEiM-rK2s9E745vkQjTdgNWyCE9cajGSpdNY_ARdUB0oyKRChvy8eE/s1600/nietzche.jpeg" /></a><span style="font-size: small;"><span> </span></span></div>
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<span style="font-size: small;"><span>Nietzche lo expresaba como queja agónica en su libro <i>"La</i></span><i><span style="font-family: Arial;"> </span></i><i><span>voluntad de poder": </span></i><i><span>"...</span></i><span> <i>el Universo es un movimiento circular que ya se ha
repetido un infinito número de veces, y que sigue su juego a través de toda la
eternidad" </i>y Poincaré extendía su certificación de validez mediante su
Teorema de recurrencia en el espacio de fases: <i>"un sistema mecánico
(del tipo de los que concibe el modelo clásico que aquí comentamos) regresará,
dado un tiempo suficientemente largo, a un estado que se halla infinitamente
próximo a la configuración inicial". </i> </span></span></div>
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<span style="font-size: small;"><span>Todo parece escrito desde
siempre, determinado, como muy bién sintetizó Laplace: <i>"Una
inteligencia que conociera, en un instante dado de tiempo, tanto las fuerzas
que actúan en la naturaleza como las posiciones (y velocidades) de todas las
cosas que existen en el Universo, sería capaz de abarcar en una sóla
fónnula,-lo suficientemente potente como para someter todos los datos a análisis-,
los movimientos de los cuerpos más grandes del Universo y los de los átomos más
ligeros. Para ella nada resultaría incierto y tanto el pasado como el futuro
estarían presentes ante sus ojos.</i></span></span></div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-82546747254708384032011-09-18T19:23:00.002+01:002011-09-18T19:35:46.295+01:00TEORÍAS DE LA VISIÓN: DE PTOLOMEO A ALHAZEN (y III)<div class="separator" style="clear: both; text-align: center;">
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<span style="font-size: small;"><b>BREVES APUNTES SOBRE LA
ÓPTICA EN EL MUNDO ÁRABE</b></span></div>
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<span style="font-size: small;">También aquí están
representadas las tres corrientes a las que hemos nos hemos referido en la
panorámica somera realizada sobre las teorías de la visión en Grecia.</span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEipbLHx1FDSqufs7XLzLqQe254NfbQ0WRbgz9ATapw6HCNWvuLTnOlLPb52aPQoWU40ifBmXNZTj5raGujkH4j6Z9JJIO8_mCQ5nsujt51XABpAwXjLEhQ-pYrXMhA0hFv4EPXIGFSNWWA/s1600/al-Kindi-clevelandpeople.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEipbLHx1FDSqufs7XLzLqQe254NfbQ0WRbgz9ATapw6HCNWvuLTnOlLPb52aPQoWU40ifBmXNZTj5raGujkH4j6Z9JJIO8_mCQ5nsujt51XABpAwXjLEhQ-pYrXMhA0hFv4EPXIGFSNWWA/s320/al-Kindi-clevelandpeople.jpg" width="231" /></a></span></div>
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<span style="font-size: small;">1.- Así, Al-Kindi (fmales
del siglo VIII) aparece como un defensor, aunque crítico, de las teorías de
Euclides. Se alinea, pues, con los partidarios de las teorías extraemisionistas
y lanza una crítica profunda contra la idea introemisionista que, a su juicio,
es insostenible. Revisa, no obstante, la teoría del cono visual y concibe el modo
en que se percibe, a través de él, de un modo diferente a como lo hacen
Euclides y Ptolomeo.</span></div>
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<span style="font-size: small;">1.1.- Crítica del
introemisionismo</span></div>
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<span style="font-size: small;">A juicio de Al-Kindi todas
las teorías de la visión desarrolladas en Grecia, excepto la de Euclides,
tienen algún elemento introemisionista por lo que, a fin de defender a aquélla,
somete a crítica exhaustiva la idea introemisionista.</span></div>
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<span style="font-size: small;">Sus argumentos son de
diversa naturaleza y a lo largo de ellos no duda en apoyarse en las razones más
diversas. Así repetirá el argumento aristotélico acerca de la capacidad de las
personas de vista débil para percibir su propia imagen frente a ellos <i>a
causa de que el poder procedente de la vista, cuando no puede penetrar el aire
a causa de su debilidad, retorna a través del aire al cuerpo del observador. </i></span></div>
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<span style="font-size: small;">Siguiendo a Teón de
Alejandría afIrma que la estructura del órgano determina su funcionamiento y, a
diferencia de los oídos, huecos para recoger el aire que produce sonido, el
ojo, esférico y móvil, está diseñado no para recoger impresiones sino para, a
través de su movilidad, desplazarse y seleccionar el objeto sobre el que
enviará sus rayos. Otro argumento es que sólo la teoría extraemisionista tiene
capacidad para explicar la selectividad de la mirada y la dependencia de la
agudeza con la posición dentro del campo visual Por otra parte, el proceso de
aprehensión del objeto en las teorías introemisionistas es, a juicio de
Al.Kindi, "global": es decir, si las formas de los objetos sensibles
penetran en el ojo, entonces, la perspectiva con la que son observados no tiene
por qué tener ninguna influencia y un círculo, visto desde cualquier punto,
debe aprehenderse siempre como tal. No obstante y <i>(... ) por el contrario cuando
los círculos y el observador están en el mismo plano, los círculos son vistos
como rectas. Por tanto </i>-concluye- <i>un cierto poder va desde el observador
a los objetos y por medio de él aquellos son percibidos.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">1.2.- Naturaleza de los
"rayos visuales"</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Para Al-Kindi la teoría de
Euclides que mantiene que los rayos visuales tienen un carácter discreto,
resulta insostenible. Éstos deben tener anchura y longitud y el cono visual
debe ser continuo.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">1.3.- Variaciones de
sensibilidad dentro del cono visual </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Al-Kindi, al polemizar con los seguidores
de Euclides, se ve obligado a reconsiderar las razones por las que los objetos
cerca del eje visual se ven con más nitidez que aquellos otros que están en la
periferia. Concluye que ello no se debe, como aseguran los euclidianos, a que
el rayo que se dirige a lo largo del eje visual sea el más corto y por tanto el
que percibe con mayor fuerza -parece aceptarse así que la potencia perceptiva
varía en relación inversa a la longitud del rayo- sino a otras razones. Que no
es así se demuestra, a su juicio, sin más que observar que un objeto colocado
en el punto de la periferia E está más próximo que otro, sobre el eje óptico,
situado en D y, sin embargo, éste último aparece más nítido. De hecho, dirá,
una estrella situada a lo largo del eje óptico aparece más nítida que cualquier
objeto situado en los laterales del campo visual. El factor determinante de la
clarida de visión no es, pues, la longitud del rayo.</span></div>
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<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhTmRWZMh0OcZEBHF8TlwLkal3PAWqDixbjsqx1kIa1zlqSHKQJqGGirJ6U6iU8rsLlJLAgXjD84WekNMgHJ4VbDP2_uhv7whjZBjKtSE0gKq4uFby5NdamBbBPueeDE-UbMxD76I1xapk/s1600/Figura07.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="160" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhTmRWZMh0OcZEBHF8TlwLkal3PAWqDixbjsqx1kIa1zlqSHKQJqGGirJ6U6iU8rsLlJLAgXjD84WekNMgHJ4VbDP2_uhv7whjZBjKtSE0gKq4uFby5NdamBbBPueeDE-UbMxD76I1xapk/s320/Figura07.jpg" width="320" /></a></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Las razones para Al-Kindi
son de dos tipos:</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">a) Su teoría se inscribe
dentro de la tradición estoica y por ello afirma que al ser la acción de ver
una transformación del medio, éste se modifica de diferente modo según sea el
poder del rayo. El rayo axial posee en mayor grado que cualquier otro esta
capacidad de modificación y a través de él se percibe con mayor nitidez.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">b) Por otra parte, y al
igual que lo que sucede cuando a una linterna se añade otra: crece la
iluminación, los lugares sobre losque inciden más rayos visuales se ven con
mayor claridad. A fin de ilustrar como se explica geométricamente este hecho
haremos referencia a la figura.</span></div>
<span style="font-size: small;"><br /></span><br />
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjTrj0ul6kLbEJCkWAbFiyeAU1r5eJ7sfweoYv2jrnP_rCWo6ffmmoWAyVfXcLl3D6BG7SJem3zsVHEyunxbylSCT7ZBXXc-fcempYZ1PW_8TwT55Bm6Fuc09fRG70MVFd7B7bWI3KQdxc/s1600/Figura08.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjTrj0ul6kLbEJCkWAbFiyeAU1r5eJ7sfweoYv2jrnP_rCWo6ffmmoWAyVfXcLl3D6BG7SJem3zsVHEyunxbylSCT7ZBXXc-fcempYZ1PW_8TwT55Bm6Fuc09fRG70MVFd7B7bWI3KQdxc/s200/Figura08.jpg" width="171" /></a></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Parece, pues, que la mayor
claridad con la que se perciben los objetos alineados con el eje óptico se
debe, no a la mayor potencia de los rayos emitidos a lo largo de él, sino al
hecho de que están en la zona que recibe una mayor cantidad de ellos.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Estos rayos proceden de la
parte exterior del ojo que se convierte así en el elemento activo -se separa
pues de Euclides y Ptolomeo que situaban el centro de actividad (el vértice del
cono visual) dentro del ojo-. </span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Es también importante
señalar que Al-Kindi introduce, en la proposición que acabamos de comentar,
serias correcciones al modelo de cono visual de la tradición matemática
anterior porque aquí llegan a cada punto del campo visual multitud de rayos en
lugar del rayo único que lo alcanzaba en las teorías de Euclides y Ptolomeo.</span></div>
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<br /></div>
<div style="text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi6Ha6FRDed7S51HxwlGdVN7Fr6QiDrmesdVpf4ppekRMNaY7zhcDsWs-DRJBh2BfMVEWV8GswFCt5fAlExN_bUfT9Co_mEsT_kChdFatuoxFkNm1SHogRCVRLy9nEFilfIk7sqkydWU2c/s1600/Figura09.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="158" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi6Ha6FRDed7S51HxwlGdVN7Fr6QiDrmesdVpf4ppekRMNaY7zhcDsWs-DRJBh2BfMVEWV8GswFCt5fAlExN_bUfT9Co_mEsT_kChdFatuoxFkNm1SHogRCVRLy9nEFilfIk7sqkydWU2c/s320/Figura09.jpg" width="320" /></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEim_79ThBV1KyWROS6ifFdUmey1ZdMwNgHSsuWJRBGSRr_45Y5tazF5QuZRAdHV9eJYotBzeG0N_ETtTGPXplnkE3qOESRIH_AQ3W-t50cklrJxRPPfrAJTDojbNLZDgroZqorYTbM9HYQ/s1600/Figura10.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="154" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEim_79ThBV1KyWROS6ifFdUmey1ZdMwNgHSsuWJRBGSRr_45Y5tazF5QuZRAdHV9eJYotBzeG0N_ETtTGPXplnkE3qOESRIH_AQ3W-t50cklrJxRPPfrAJTDojbNLZDgroZqorYTbM9HYQ/s320/Figura10.jpg" width="320" /></a></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">2.- La enorme influencia de
Galeno, como consecuencia del profundo interés que suscitó en el Islam la
medicina, provocó que la física médica tuviera importantes defensores, entre
los que cabe destacar a Hunain ibn Ishaq (muerto en el 877). Hunain se centra,
en el libro <i>Diez tratados sobre el ojo (Sobre las estructuras del ojo, sus
enfermedades y sus tratamientos), </i>en la descripción de la anatomía y
fisiología ocular y en el estudio de los nervios ópticos, desarrollando, en la última
parte del tercero de ellos, una teoría de la visión de raíces profundamente galénicas.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg-CfUpu92W1GH8qjnZKo_2ZfuATTXnMg8x7UcSVIQ2MpBlRXPafxfI-66ReqqtQvkDEfiCjhsEawPgtZeAdn0F2powvcBJOXbFxhWEHH7uIVp6kDprChG-4QlfD7He8WTcOPmkEn8o5UY/s1600/hunain.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg-CfUpu92W1GH8qjnZKo_2ZfuATTXnMg8x7UcSVIQ2MpBlRXPafxfI-66ReqqtQvkDEfiCjhsEawPgtZeAdn0F2powvcBJOXbFxhWEHH7uIVp6kDprChG-4QlfD7He8WTcOPmkEn8o5UY/s320/hunain.jpeg" width="239" /></a></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">2.1.- ¿Cómo concebían los
médicos de la época el proceso de percepción visual? ¿Qué conocían sobre
anatomía y fisiología ocular?</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Acabamos de apuntar la
enorme influencia ejercida por Galeno en la medicina árabe, no es extraño por
tanto que la anatomía y fisiología del ojo sea, en el Islam, profundamente
galénica. Así, Hunain, usa, en los dos primeros capítulos del libro antes
referido, el contenido del libro 10 del tratado de Galeno <i>Del uso de las
partes.</i></span></div>
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<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhdQla2NZ6ygVsUbm53NlkcIm8fftAk4BBsjDFpMR7ZvUZIqkZTmS1DQ_ms-PJREm7T_lKkcUvwCepwCMpQR5pQlhP80-PPVLvdhv0qbjY5-ciiN7TyceG4Qta4PZLW8xjHDI4JPmrIKBs/s1600/Figura11.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="246" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhdQla2NZ6ygVsUbm53NlkcIm8fftAk4BBsjDFpMR7ZvUZIqkZTmS1DQ_ms-PJREm7T_lKkcUvwCepwCMpQR5pQlhP80-PPVLvdhv0qbjY5-ciiN7TyceG4Qta4PZLW8xjHDI4JPmrIKBs/s320/Figura11.jpg" width="320" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El objeto central del ojo
es el <i>humor cristalino </i>que es incoloro, transparente, luminoso y
redondo. Su redondez no es, no obstante, total puesto que presenta un cierto
achatamiento cuya finalidad no es otra que <i>permitirle recibir más
impresiones de los objetos perceptibles que las que recibiría en el caso de que
fuera perfectamente redondo; ya que un cuerpo achatado encuentra más de los
objetos que están en su camino que lo que encuentra un cuerpo esférico
perfecto. </i>El humor cristalino ocupa la posición central del ojo no sólo con
el objeto de recibir los servicios de los otros humores oculares y túnicas sino
como expresión de su rango al ser el asiento o sede del poder visual.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Detrás del humor cristalino
está el <i>humor vítreo </i>cuya función principal es la de nutrir al primero
mediando entre él y los vasos sanguíneos de la retina.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Hunain lo expresa así: <i>La
nutrición tiene lugar de este sabio modo: que el miembro nutrido reciba una
adición de sustancia que posea su misma naturaleza (... )</i> <i>Como las
lentes necesitan nutrirse y como, según hemos ya señalado, su humor es blanco,
transparente y luminoso, resulta imposible que reciba su nutrición directamente
de la sangre. Se requiere un elemento de intermediación entre él y la sangre;
el humor vítreo, de características más próximas a la blancura y transparencia que
la sangre, cumple esa función. Por ello el humor vítreo tiene una posición adyacente
a las lentes, sin separación alguna, y éstas yacen sumergidas en aquél.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Detrás del humor vítreo hay
tres túnicas: <i>la retina, la coroide y la esclerótica.</i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La <i>retina </i>nace desde el
nervio óptico y encierra el humor vítreo. A través de sus venas y artenas nutre
a éste y por su intermedio al humor cristalino, transportando además a este
último, por medio del nervio óptico, el <i>pneuma </i>visual. La <i>coroide</i>, que
nace de la envoltura interior del nervio óptico, cubre y alimenta a la retina
mientras que la <i>esclerótica</i>, nace de la envoltura externa del nervio óptico y su
función es eminentemente protectora.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Hay también un humor y tres
túnicas en la parte anterior del cristalino. El <i>humor acuoso </i>(o
albuminoide) de apariencia similar a la clara de un huevo, separa el humor
cristalino de la <i>úvea </i>(túnica que se asemeja a la cáscara de una uva y
que prolonga la coroide por la parte anterior del ojo) y su función es nutrir y
humedecer al cristalino. La úvea que posee una apertura en su parte anterior a
través de la cual puede salir el <i>pneuma, </i>nutre, a su vez, a la córnea y
evita que ésta pueda dañar al cristalino. La <i>córnea, </i>prolongación de la
esclerótica, es transparente y dura actuando como elemento de protección del
globo ocular. Finalmente una última túnica, <i>la conjuntiva, </i>recubre el
conjunto.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Además del globo ocular, el
aparato óptico consta de los denominados nervios ópticos que nacen en la parte
posterior de los ventrículos anteriores del cerebro, se unen brevemente en el <i>quiasma
óptico </i>y se dirigen a los ojos, de modo que <i>el nervio que tiene su
origen en la parte derecha del cerebro va al ojo derecho y el que nace en el lado
izquierdo termina también en el ojo izquierdo. </i>Los nervios ópticos son
huecos de modo que puedan actuar como canales que conducen el <i>pneuma </i>óptico
desde el cerebro a los ojos.</span></div>
<span style="font-size: small;"><br /></span><br />
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEivnVAv4fzD3sczKsBGiaMrke4rCHaPEorPpRI4dAxH9SGTXTvmoc6bFjSSTpXpkqJ5tJeWikjeUybwzpC_9blRNc6NJe7ydqdy4KgXgdLhlRlj1jNCmGOAV6zN_UgEzig1sBqw1RFGeEk/s1600/Figura12.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="305" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEivnVAv4fzD3sczKsBGiaMrke4rCHaPEorPpRI4dAxH9SGTXTvmoc6bFjSSTpXpkqJ5tJeWikjeUybwzpC_9blRNc6NJe7ydqdy4KgXgdLhlRlj1jNCmGOAV6zN_UgEzig1sBqw1RFGeEk/s320/Figura12.jpg" width="320" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La función del <i>quiasma
óptico </i>es, para Hunain, la de redistribuir el <i>pneuma, </i>de forma que
cuando se ciega o se cierra un ojo el que queda abierto expele mayor cantidad
de fluido visual reforzándose su capacidad perceptiva: <i>(...) si uno cierra uno
de los ojos, la visión obtenida con el otro deviene más clara y aguda. La razón
no es otra que el que todo el poder que antes se repartía entre los dos ojos </i><i>... ahora se concentra en
uno sólo. </i></span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Esto queda conftrmado, a su
juicio, porque si se cierra un ojo, la pupila del otro se agranda como
consecuencia de que la <i>úvea </i>se distiende a causa del incremento de <i>pneuma </i>que
sale a través del ojo abierto.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Otra de las funciones de
este quiasma, cuya importancia no necesita justificarse, es la de dotar al
fluido visual de un origen común a fm de que la visión binocular no genere dos
imágenes distintas.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Este esquema anatómico y
ftsiológico será utilizado, con algunas ligeras matizaciones, por todos
aquellos que se ocuparon del problema de la visión en el mundo islámico.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">3.- Las traducciones de
Aristóteles al árabe fueron múltiples y muy tempranas, no es extraño que su
filosofía ejerciera una influencia importantísima en todos los campos del saber
y en concreto en el ámbito de la Física. Su psicología, como ya hemos señalado
con anterioridad, conceptúa a los órganos de los sentidos como elementos
pasivos en los procesos de percepción y por ello el extraemisionismo no tiene
cabida en su sistema. No es extraño, pues, que los aristotélicos árabes
desarrollaran una crítica acerada de las teorías extraemisionistas en sus
diferentes versiones euclídea y estoica.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">3.1.- Crítica del extraemisionismo</span></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Serán Avicena (980-1037) y Averroes (1126-1198) los dos filósofos árabes que con mayor rigor defenderán
las tesis aristotélicas sobre el proceso de visión; someterán por ello a
crítica la física extraemisioista que subyace en las corrientes euclídea y
estoica.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<br /></div>
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiV5dvwzXyHk80xLlbNXp9Vq402XpEKDR95wJEOB2e-IMN-qqrztaOALjUp0yMU_UQOVUUKCLHuMglUQa6wIgSRS2tsJkWFVV3Q69hObwcGvtCX1C7O6EhxCq-eeaINYWpuSgrQMHe_dRk/s1600/averroes.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="248" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiV5dvwzXyHk80xLlbNXp9Vq402XpEKDR95wJEOB2e-IMN-qqrztaOALjUp0yMU_UQOVUUKCLHuMglUQa6wIgSRS2tsJkWFVV3Q69hObwcGvtCX1C7O6EhxCq-eeaINYWpuSgrQMHe_dRk/s320/averroes.jpeg" width="320" /></a></span></div>
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<span style="font-size: small;">a)<span style="font-family: "Times New Roman"; font-size-adjust: none; font-stretch: normal; font-style: normal; font-variant: normal; font-weight: normal; line-height: normal;"> </span>Refutación de la
teoría euclídea de la visión: A fin de tomar en consideración todas las
alternativas presentes en el esquema euclídeo, Avicena considera cuatro modos
de "entender" dicho esquema: a) la sustancia emitida por el ojo radialmente
es de naturaleza corpórea y continua y mediante ella se establece el contacto
entre el ojo y el objeto visible; b) lo que se emite desde el ojo del
observador es una sustancia continua que hace contacto con el objeto visible
desligándose de aquél; c) la sustancia emitida desde el ojo consta de rayos
separados que tocan al objeto sólo en ciertos puntos del mismo; y d) la
sustancia corpórea no establece contacto alguno con el objeto visible.</span></div>
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<span style="font-size: small;"> </span></div>
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<span style="font-size: small;">Para Avicena resulta
absurdo suponer que algo tan pequeño como el ojo puede emitir una sustancia
material continua capaz de llenar una semiesfera tan amplia como la que
visualizan nuestros ojos. Por otra parte esa emisión material, de acuerdo con
el principio general de que dos cuerpos no pueden ocupar simultáneamente el
mismo lugar, deberá barrer el aire existente entre el objeto visto y el foco
emisor. A Avicena tal posibilidad le resulta absurda. A su juicio, además, el hecho
de que sea la base del cono visual la que perciba el tamaño y forma de los objetos
impide explicar el por qué los objetos más alejados nos resultan más pequeños -dotar
de contenido físico a la teoría euclídea la inhabilita, pues, para explicar la
perspectiva-. A este tema volverá más
tarde cuando defienda la concepción aristotélica.</span></div>
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<span style="font-size: small;">La tercera de las
versiones, que es en realidad la más próxima a las ideas de Euclides, tiene,
desde el punto de vista de Avicena, la dificultad de que al percibir los rayos
sólo aquello que tocan, el observador <i>sólo verá las zonas donde estos rayos
caigan y dejará de ver aquellas otras donde los rayos no incidan; el cuerpo solo
será, así, percibido parcialmente (...). </i>Por otra parte, y como
consecuencia de la imposibilidad de
existencia del vacío, Avicena se interroga en estos términos: <i>Si los rayos
visuales penetran en el agua -puesto que vemos a través de ella creando pasadizos
que antes no existían, ¿cómo es que no aumenta el volumen del liquido a causa
de la adición de la sustancia corpórea de los rayos visuales?</i></span></div>
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<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhwpyEtNvI-PsOqixRk8ETdQKCQuG91DuAAHOaQQn9PtRo5r922fXoz8EMzhhCO3LPyQ7iSeX-ifFNuPf-sUoCPCZl515RDgV2p5uXwfqZxxiLQIAs3GyacjKaA-SaC02Ec1cD2ND7L2Bw/s1600/Avicena.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhwpyEtNvI-PsOqixRk8ETdQKCQuG91DuAAHOaQQn9PtRo5r922fXoz8EMzhhCO3LPyQ7iSeX-ifFNuPf-sUoCPCZl515RDgV2p5uXwfqZxxiLQIAs3GyacjKaA-SaC02Ec1cD2ND7L2Bw/s320/Avicena.jpg" width="224" /></a></span></div>
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<span style="font-size: small;">b) Refutación de la teoría
galénica: de acuerdo con su conceptuación, los partidarios de esta teoría
sostienen que los rayos emitidos por el ojo no perciben directamente el objeto
visible sino que utilizan el medio transparente -aire o cualquier otro- que hay
entre observador y objeto observado, como su instrumento. El medio
transparente, pues, adquiere una nueva disposición o estado de tensión que, a
juicio de Avicena, resulta imposible porque ello implicaría que tal estado
sería compartido por todos los que en aquél momento estuvieran observando el
objeto y, así, <i>las personas de vista debilitada verían mejor si se agruparan
(...) </i><i>y un hombre de poca vista vería con más nitidez si estuviera
cerca de otro cuya visión es más potente (...) </i><i>Constatamos que un
hombre de vista debilitada no mejora su visión uniéndose a otros con mejor
vista o a muchos otros también débiles de vista. Esta opinión es, por tanto,
falsa. </i>La conversión del medio en "algo" distinto -bien sea
transmisor de las impresiones visuales a cada individuo concreto o bien
prolongación del órgano visual que siente- por la acción del <i>pneuma </i>es
criticada ampliamente por Avicena en su tratado <b>Kitab al-Shifa </b>en el que
concluye que la teoría galénica debe rechazarse por redundante.</span></div>
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<span style="font-size: small;">c) Reafirmación de la teoría
aristotélica: en el libro que acabamos de mencionar Avicena afirma: <i>Al igual
que otros sensibles no son percibidos porque algo se extienda desde los órganos
de los sentidos hacia ellos y los encuentre o se una a ellos o les envíe un
mensajero, la visión no tiene lugar como consecuencia de que sea emitido un
rayo, de una u otra manera, y alcance al objeto sino a causa de que la forma del
objeto llega a la vista transmitido por el medio transparente.</i></span></div>
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<span style="font-size: small;">Avicena acepta en todos sus
extremos la versión expuesta por Aristóteles en el tratado <i>Acerca del Alma </i>(comentada
más arriba) pero la lleva un poco más lejos tratando de incorporar lo que de
más atractivo tiene la teoría euclídea: su lenguaje matemático, y para ello no
duda en afmnar lo siguiente: <i>el ojo es como un espejo, y el objeto visible
es como el objeto que se refleja en un espejo por la mediación del aire o de
otro cuerpo transparente; y cuando la luz incide sobre el objeto visible,
proyecta la imagen del objeto sobre el ojo (...) </i><i>Si un espejo poseyera alma,
vería la imagen que se forma sobre él.</i></span></div>
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<span style="font-size: small;">Puede resultar interesante
analizar la explicación que da Avicena al cambio de tamaño de los objetos con
la distancia utilizando esta idea de que la visión se obtiene como consecuencia
de la reflexión especular porque, por primera vez, se hace un uso de la
matemática en una teoría introemisionista.</span></div>
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<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgkO3HLwjt0QsQKTbfgRd7Kg__TL6CMCd1tUR0c75koLMSg86y3voZzz3mRQbPCpV4dI_SeJoSuRzgnxmlxKR1UdEENOi01w6hxNUr4uY6sQot8a230KJhnMRzKJEdhaDcdoS5nVN9W3Ps/s1600/Figura13.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgkO3HLwjt0QsQKTbfgRd7Kg__TL6CMCd1tUR0c75koLMSg86y3voZzz3mRQbPCpV4dI_SeJoSuRzgnxmlxKR1UdEENOi01w6hxNUr4uY6sQot8a230KJhnMRzKJEdhaDcdoS5nVN9W3Ps/s320/Figura13.jpg" width="175" /></a></span></div>
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<span style="font-size: small;"></span></div>
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<span style="font-size: small;"> Un objeto situado en HD
estampará una imagen en AB, sobre la superficie del ojo; si el mismo objeto se
traslada a KZ la imagen en el ojo se restringirá al arco TY, menor que AB: <i>(...) Y todo lo que se forma sobre un arco menor se ve también menor; por tanto
la imagen del objeto colocado en KZ es menor. </i>Más adelante escribirá: <i>Es
extraño que la gente que defiende la teoría de los rayos </i>(que emanan del
ojo) <i>hablen también del ángulo </i>(formado en el ojo por el objeto visible);
<i>porque este ángulo sólo resulta útil cuando la imagen viene hacia el ojo pero
no cuando la vista avanza hacia el objeto. </i>Avicena sostiene, pues, que solo
la teoría introemisionista de Aristóteles es consistente con el tratamiento
geométrico del proceso de visión robándole al extraemisionismo su arma más
poderosa y atractiva.</span></div>
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<span style="font-size: small;"><b>LA <i>ÓPTICA </i>DE ALHAZEN</b></span></div>
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<span style="font-size: small;">Alhazen somete nuevamente a
crítica las teorías extraemisionistas añadiendo, a los argumentos hasta
entonces esgrimidos, otros nuevos que recoge en su obra maestra de óptica <b>Kitab
al·Manazir </b><i>(De aspectibus).</i></span></div>
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<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgZp5Yd1beIWxqxcT4Y6j_VVlallgJbPhrHpGtcddPDv4ZCvXnqWXHCefyG9DOOBvi1sp9tW6ztB6naodzR3BtfcUipSFM2ELekl3yOXfhXw7ucQNlQHe_R9LB2l6RoB3ogs3hanmkDJs0/s1600/alhazen.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgZp5Yd1beIWxqxcT4Y6j_VVlallgJbPhrHpGtcddPDv4ZCvXnqWXHCefyG9DOOBvi1sp9tW6ztB6naodzR3BtfcUipSFM2ELekl3yOXfhXw7ucQNlQHe_R9LB2l6RoB3ogs3hanmkDJs0/s1600/alhazen.jpeg" /></a></span></div>
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<span style="font-size: small;">Así, en primer lugar,
señala: <i>Encontramos que cuando el ojo se fija en una luz extremadamente
brillante, sufre a causa de ello y es dañado; así, cuando alguien mira al Sol
no puede verlo con claridad porque sus ojos experimentan dolor a causa de su luz.
Esto mismo ocurre cuando mira, desde la posición en que la luz es reflejada, un
espejo pulimentado sobre el que incide la luz del Sol. Sus ojos se verán
nuevamente dañados por la luz que los alcanza y"no será capaz de
mantenerlos abiertos. </i>Las heridas se producen por medio de agentes externos
y, por ello, el proceso de visión es producto de una acción exterior. El
proceso de la visión posterior o retardada también avala, a su juicio, esta
posición introemisionista.</span></div>
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<br /></div>
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<span style="font-size: small;">Alhazen es cauto, sin
embargo, y, consciente de la capacidad adaptativa de las teorías físicas,
afIrma solamente que <i>es una propiedad de la luz el actuar sobre el ojo y
está en la naturaleza del ojo en ser afectado por aquélla.</i></span></div>
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<span style="font-size: small;">En segundo lugar Alhazen,
totalmente convencido de que la percepción visual tiene lugar en el ojo y la
mente del observador y no en el lugar en que los rayos contactan con el objeto
<i>(...) el ojo no percibe la luz y el color a menos que algo llegue al ojo
desde el objeto iluminado y coloreado (...), </i>se dedicará a mostrar que los
rayos visuales resultan superfluos y así escribirá: <i>(...) </i>(1os matemáticos que postulan la existencia
de rayos visuales) <i>solo usan en sus demostraciones líneas imaginarias a las
que llaman líneas radiales... y la creencia de los que consideran a estos rayos
como simples líneas imaginarias es correcta, pero no lo es la de aquellos otros
que suponen que algo real es emitido desde el ojo. </i>Los rayos pueden, pues,
utilizarse matemáticamente pero no poseen realidad física alguna.</span></div>
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<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBjbjGlsknhuYXSklpfS8R1gNaFkHVNm3ap6AZGTovXcdHGI8fuNgnNO6HKgTBX8NxCTfBkwQR8cpgY4Fxlwjy-iw9_uGeErpLX97I3QByBWt2j07AAtv2ae9xvak2TLc_i_j1RbNqpNc/s1600/Figura14.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBjbjGlsknhuYXSklpfS8R1gNaFkHVNm3ap6AZGTovXcdHGI8fuNgnNO6HKgTBX8NxCTfBkwQR8cpgY4Fxlwjy-iw9_uGeErpLX97I3QByBWt2j07AAtv2ae9xvak2TLc_i_j1RbNqpNc/s320/Figura14.jpg" width="195" /></a></span></div>
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<br /></div>
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<span style="font-size: small;">Alhazen acepta la
descripción galénica del aparato óptico y admite que es en el cristalino donde
se produce la "fijación" de las formas y los colores provenientes de
los objetos: <i>(...) </i>(cuando la forma de la luz) <i>alcanza la superficie del humor
cristalino, actúa sobre él, y éste sufre a causa de la forma, porque es una propiedad
de la luz el actuar sobre el ojo y una propiedad de éste el sufrir a causa de
aquélla. Y este efecto, que la luz produce en el cristalino, lo atraviesa (...) </i><i>y lo percibe a través del ordenamiento de las partes de la forma en la
superficie y en todo el cuerpo del cristalino (...). </i>Será este
ordenamiento de la forma en la superficie y en el volumen del cristalino el
problema que Alhazen tendrá que resolver para que su teoría introemisionista
sea aceptada.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Recordemos que, después de
las críticas a las que habían sido sometidas las teorías extra e
introemisionistas, parecía complicado construir un nuevo esquema que fuera
capaz de dar respuesta a las diferentes objeciones. Alhazen llevará a cabo esa
labor y desarrollará una teoría que integra en un cuerpo único los aspectos positivos
que presentan las tres corrientes de pensamiento cuya historia hemos intentado
trazar.</span></div>
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<span style="font-size: small;">¿QUÉ RASGOS NUEVOS TIENE
SU TEORÍA?</span></div>
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<span style="font-size: small;">La primera diferencia
sustancial en relación a las teorías introemisionistas que le precedieron hay
que buscarla en que en su caso la emisión desde el objeto es puntiforme: cada
punto del objeto iluminado y coloreado radia en todas direcciones: (...) <i>desde
cada punto de todo objeto coloreado, iluminado por cualquier luz, mana luz y
color a lo largo de cualquier línea recta que pueda trazarse desde dicho punto.
</i>La impresión visual coherente que percibimos debe pues reconstruirse a
partir de la emisión desde multitud de fuentes de radiación incoherente. Parece claro que una de
las dificultades máximas para desarrollar una teoría coherente del proceso de
visión es el que concierne al modo en que se forma la
imagen en el ojo o en la mente. De ahí que la mayor parte de las teorías hayan
concebido el proceso mediante una aprehensión
completa bien por medio de la emisión de simulacros desde el objeto o bien
mediante una especie de palpación por medio de los
rayos visuales. A Alhazen se debe el mérito de acabar con este esquema porque
mediante su teoría la reconstrucción de la imagen
del objeto se hace a través de una integración a partir de puntos.</span></div>
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<br /></div>
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<span style="font-size: small;">.</span></div>
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjShGC7stxqsh2yEkWu3LesbhYtg8-pdfUtj-5XqxUO5xmh9JnV8OLz2ljYIhQAzSYsgGNW9N6comFsBX_2nWSuOMurWfvSpAqpzKRnF2wf1LWLYce_bV7rpxRkGNFQhFR7OZnrLzs4lok/s1600/Figura15.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="147" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjShGC7stxqsh2yEkWu3LesbhYtg8-pdfUtj-5XqxUO5xmh9JnV8OLz2ljYIhQAzSYsgGNW9N6comFsBX_2nWSuOMurWfvSpAqpzKRnF2wf1LWLYce_bV7rpxRkGNFQhFR7OZnrLzs4lok/s400/Figura15.jpg" width="400" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Las dificultades de esta
reconstrucción aparecen de modo inmediato porque a cada punto del ojo llega luz
y color procedente de cada punto del objeto, ¿cómo es que no se produce una
confusión y mezcla de luces y de colores?, ¿cómo es que se percibe una imagen
que reconstruye la forma y el color del objeto observado?, ¿cómo es posible que
pueda establecerse una correspondencia biunívoca entre los puntos de un objeto
enorme con los de una imagen de tamaño muy inferior?</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El problema de la reconstrucción
tiene, pues, una dimensión física producto de la sobreabundancia de rayos que
llegan a la superficie exterior del ojo y una dimensión matemática que tiene
que ver con la medida de los conjuntos infinitos.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En efecto, una
reconstrucción que reproduzca la forma y color del objeto emisor exige que cada
punto de la superficie del cristalino reciba un solo rayo procedente de aquél,
es decir, hay que establecer una correspondencia biunívoca entre los puntos del
campo visual y los puntos del cristalino. Expresado de un modo sencillo diríamos
que en el trayecto desde la superficie del ojo a la superficie del
cristalino --en el que se produce la detección si consideramos que la
recomposición debe ser "idéntica y no invertida"- deben
"perderse" (o atenuarse) todos los rayos excepto uno.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Alhazen hará uso de un
fenómeno que ya había sido estudiado por Ptolomeo y que hasta ahora no había
sido utilizado en ninguna de las teorías ópticas: la refracción.</span></div>
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<span style="font-size: small;"> </span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">A pesar de que no había
sido posible obtener las leyes cuantitativas de este fenómeno sí era conocido
el comportamiento cualitativo de los rayos refractados que, como sabemos, se
desvían de la línea de incidencia acercándose o alejándose de la normal según
se pase desde un medio menos denso a otro más denso o viceversa. Sólo los rayos
que inciden perpendicularmente a la superficie de separación pasan sin
desviación alguna; serán precisamente éstos los que jueguen un papel
fundamental en la teoría óptica de Alhazen quien en su obra ya citada <i>De aspectibus
</i>escribirá: <i>A través de cada punto de la superficie del ojo pasan
simultáneamente las formas de todos los puntos del campo visual, pero sólo la
forma de un único punto incide perpendicularmente y pasa directamente (sin
refractarse) a través de la transparencia de las túnicas y humores oculares,
ese punto (del campo visual) está localizado en el extremo de la perpendicular
trazada desde el punto de la superficie del ojo que estamos considerando. El
resto de las formas de otros puntos del campo visual son refractados en el punto
de la superficie del ojo considerado y atraviesan la transparencia de las
túnicas y humores oblicuamente.</i></span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Cada punto de la córnea
recibe, pues, un único rayo perpendicular que pasa al cristalino sin
refractarse, el conjunto de todos estos rayos constituye un cono con el campo
visual como base y el centro del ojo como vértice (¡el cono visual de la teoría
matemática encuentra aquí su homólogo!). Una teoría introemisionista consigue, por
primera vez, incorporar a su estructura la potencia que comporta el uso de las
matemáticas.</span></div>
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<br /></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Alhazen dedicará parte de
su tratado a buscar argumentos (que desde nuestra perspectiva actual no son
excesivamente convincentes) que justifiquen la eliminación de los rayos
refractados intentando convencer al lector de su escasa capacidad de
"dejar huella". Por otra parte también mostrará con su invención de la
<i>cámara oscura </i>que los numerosos rayos que penetran a través de la pupila
en su paso hacia el cristalino no se perturban entre sí y se propagan
independientemente.</span></div>
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<span style="font-size: small;"><b><i>BIBLIOGRAFÍA</i></b></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Aristóteles, <i>Acerca del Alma</i>,
Ed. <span lang="EN-GB">Gredos</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Cohen Mortis and Drabkin L. E., <i>A Source Book in Greek Science,</i> Harvard
University Press</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Lindberg David C., <i>Theories of Vision</i>, Chicago Press</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Park David, <i>The fire within the eye</i>, Princeton University Press</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Platón, <i>Timeo, </i>Ed. Gredos</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Sambursky S., <i>El mundo
físico de los griegos</i> y <i>El mundo físico a finales
de la Antigüedad</i>, Alianza</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Smith A. Mark, <i>Ptolemy's Theory of Visual Perception (Optics), </i>Transactions
of the American Philosophical Society</span></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><span lang="EN-GB">Zajonc Arthur, <i>Catching the Light</i>, Oxford University Press</span></span></div>
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miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0tag:blogger.com,1999:blog-723507907050872766.post-72960747840711992982011-09-16T17:05:00.000+01:002011-09-16T17:07:34.814+01:00TEORIAS DE LA VISIÓN: DE PTOLOMEO A ALHAZEN (II)<div class="separator" style="clear: both; text-align: center;">
</div>
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<br /></div>
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<span style="font-size: small;"><b>EUCLIDES Y PTOLOMEO</b></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Puede ser interesante
desarrollar un breve estudio comparado de estos dos autores que comparten una
concepción extraemisionista del proceso de visión y que adoptan un modo
matemático de abordar el proceso de visión. </span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Ambos son personajes relevantes dentro de la historia de la Ciencia y conocidos por sus aportaciones a esta: el primero es un representante eximio de
la Matemática griega a la que canonizó en <i>Los Elementos </i>y el segundo es el autor de la más precisa teoría astronómica de la antigüedad compendiada en <i>La
sintaxis matemática (el Almagesto). </i> </span></div>
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<span style="font-size: small;">Ambos desarrollan su obra dentro de
ese largo período que se conoce como Helenismo alcanzando, el primero, su
período de máximo esplendor en torno al 300 a.C. y el segundo, alrededor del 130
d.C. No es extraño, pues, que sus investigaciones, al igual que las de otros
importantes representantes de la ciencia helenística, huyan de las grandes concepciones
que marcaron la etapa de oro del pensamiento filosófico clásico y se centren en
parcelas de conocimiento más concreto.</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Sus obras, pese a estar
encuadradas dentro de la corriente matemática, no están vacías de física,
aunque ésta no ocupa el núcleo central de sus tratados ni, en muchos casos, se
hace especialmente explícita. </span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Hemos de recordar que los procesos ópticos son abordados desde una perspectiva
totalmente estática (la única susceptible de matematizarse dadas las
limitaciones de la matemática griega para "atrapar lo móvil") y esencialmente
geométrica.</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><b>LA ÓPTICA DE EUCLIDES</b></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjU-lc1BHDd7eOryoAUKqGF9BI8U3VCRgV9GT-xMPVrX46MW4gdDEhwoUanyfTLUgkY6D-67SyBNaG_n3TFgbilFfoniNJOdapz17SdHvh6TZLGXYFLyEwbZjWVKvDSEA3m_RWNtjpkP9A/s1600/euclides.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjU-lc1BHDd7eOryoAUKqGF9BI8U3VCRgV9GT-xMPVrX46MW4gdDEhwoUanyfTLUgkY6D-67SyBNaG_n3TFgbilFfoniNJOdapz17SdHvh6TZLGXYFLyEwbZjWVKvDSEA3m_RWNtjpkP9A/s320/euclides.jpg" width="202" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">El Tratado consiste en un
conjunto de definiciones (7) </span><span style="font-size: small;">–</span><span style="font-size: small;">en las que pueden rastrearse ciertas
concepciones físicas</span><span style="font-size: small;">–</span><span style="font-size: small;">, seguido de 58 teoremas demostrados geométricamente.</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">Definiciones</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><i>Supóngase:</i></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><i>1) Que los rayos
rectilíneos procedentes del ojo divergen indefinidamente.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>2) Que la figura
contenida por un conjunto de rayos visuales es un cono del que el vértice está
en el ojo y la base en la superficie del objeto visto.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>3) Que las cosas vistas
son aquellas sobre las que caen los rayos visuales y las no vistas aquellas
otras sobre las que los rayos visuales no inciden.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>4) Que las cosas que se
ven bajo un ángulo mayor, aparecen mayores, las que se ven bajo un ángulo menor
aparecen menores y las que se ven bajo el mismo ángulo aparecen iguales.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>5) Que las cosas que se
ven bajo rayos visuales más altos aparecen más altos y las cosas que se ven
bajo rayos visuales más bajos aparecen más bajos.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>6) Que, de modo similar,
aquellas vistas por los rayos más hacia la derecha aparecen más a la derecha y
las que se ven más hacia la izquierda aparecen más hacia la izquierda.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>7) Que las cosas vistas
bajo mayor número de ángulos se ven con más claridad.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">El ojo aparece en estos
postulados como un agente activo en el proceso de visión, emitiendo
"algo" para aprehender el objeto observado. Dentro del cono de rayos
visuales hay regiones que se "sienten" y otras que no; parece claro
pues, que los rayos visuales no son meros recursos geométricos sino que, por el
contrario, son agentes físicos en el proceso de visión. En el postulado 7) y
en la proposición II se intenta dar una explicación física del grado de
claridad de una percepción y se concluye que éste depende del número de ángulos
bajo el que se ve un objeto o, dicho de otro modo, del número de rayos visuales
interceptados por el objeto.</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">Veamos a continuación, a
modo de ejemplo, algunas de las proposiciones demostradas por Euclides:</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><b>Proposición II: </b><i>De magnitudes iguales situadas a diferentes
distancias, las que están más cerca aparecen más claras.</i></span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiP_Cfnkbwk3YfwUkOSCFB7JiJa07VmNNfrRPks0kHOZqlc9SUssxD51ZUTv2nV08V2xk0ha3cgzWwL1ilZVwmTz9TEkcqlCVzZizJ8V7I-q7ty6fxFH-EhJu46rrLk75vvRSRgbecJ4zI/s1600/Figura01.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiP_Cfnkbwk3YfwUkOSCFB7JiJa07VmNNfrRPks0kHOZqlc9SUssxD51ZUTv2nV08V2xk0ha3cgzWwL1ilZVwmTz9TEkcqlCVzZizJ8V7I-q7ty6fxFH-EhJu46rrLk75vvRSRgbecJ4zI/s320/Figura01.jpg" width="250" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;">Los rayos visuales a KL no
pasan por los puntos G y D porque si lo hicieran, en el triángulo que
resultaría BDLKGB, KL sería mayor que GD en contra de lo que hemos supuesto.</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El segmento GD será, por
tanto, visto por más rayos visuales que el KL y en consecuencia aparecerá más
claro ya que los objetos vistos bajo un mayor número de ángulos resultan más
nítidos.</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Proposición IV: <i>De los
intervalos iguales situados sobre la misma recta, aquellas que se ven desde una
distancia mayor aparecen más pequeñas.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Proposición VI: <i>Las
líneas paralelas, cuando se ven desde una cierta distancia aparecen
desigualmente separadas.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh2PMXiHPIXBMY5C1aVBmt9-VD0kcZtn4SK85bQ15hyphenhyphenegh05R0VAAW0zSJQC6-rgzYmULTC6VrnkBXaAf1CfGyQ8upnXbyP0qHwzJUdtePgO0lQQx2QP2EBRxY2rCK1Ug3P9jIMvr65NqE/s1600/Figura02.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh2PMXiHPIXBMY5C1aVBmt9-VD0kcZtn4SK85bQ15hyphenhyphenegh05R0VAAW0zSJQC6-rgzYmULTC6VrnkBXaAf1CfGyQ8upnXbyP0qHwzJUdtePgO0lQQx2QP2EBRxY2rCK1Ug3P9jIMvr65NqE/s320/Figura02.jpg" width="320" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Se trata de mostrar que los
segmentos TK, ZH, BD aparecen, vistos desde E, distintos y, en
concreto, TK< ZH < BD.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La demostración es
inmediata, sin más que ver que Ang. ZEH > Ang. TEK y en consecuencia ZH > TK al verse el segmento ZH a través de más
ángulos que el TK.</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">De igual modo BD > ZH.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: center;">
<span style="font-size: small;">BD > ZH > TK en
apariencia</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><i>Los intervalos entre
paralelas no aparecen por tanto iguales, sino desiguales y de ahí el efecto visual de confluencia de las paralelas.</i></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: center;">
<span style="font-size: small;"><b>LA ÓPTICA DE PTOLOMEO</b></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="separator" style="clear: both; text-align: center;">
<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhM1-uJ5hiEenu0rcM0tETRIuZwAjVrS_C-XEA1JcTy2Xk17valawwaByJxjLZnv0EjNHrnn5lKLOuUyBVPTvshGoMFRM_k76fdzfM-8Ic3fh_9fQMESeI-KP6O6WIay7QlschbIxvFNrE/s1600/ptolomeo.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhM1-uJ5hiEenu0rcM0tETRIuZwAjVrS_C-XEA1JcTy2Xk17valawwaByJxjLZnv0EjNHrnn5lKLOuUyBVPTvshGoMFRM_k76fdzfM-8Ic3fh_9fQMESeI-KP6O6WIay7QlschbIxvFNrE/s1600/ptolomeo.jpeg" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">En el libro hay un mayor
énfasis en los aspectos físicos de la radiación visual y en él son perceptibles
influencias de Platón y los estoicos e, incluso, de Aristóteles. El flujo
visual parece concebirse en ocasiones como una emanación de <i>pneuma </i>desde
el ojo, pasando a ser los rayos, líneas a través de las que se "siente"
por medio del aire que rodea al ojo; en otros momentos, como cuando trata de
abordar los fenómenos de reflexión y refracción, los rayos parecen adoptar la
forma de emanaciones de partículas. En cualquier caso, emitidos a gran velocidad,
los rayos golpean los objetos externos y, al hacer esto, los perciben –los sienten</span><span style="font-size: small;">– </span><span style="font-size: small;">visualmente. La vista se asemeja, pues, al tacto en el modo en que opera.</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Por otra parte, la
sensibilidad del flujo visual es variable, disminuyendo con la distancia y con
la oblicuidad respecto al eje del cono (conviene hacer notar que estos hechos
los infiere Ptolomeo de la experiencia </span><span style="font-size: small;">–</span><span style="font-size: small;">a la que concede una mayor importancia
explícita que Euclides</span><span style="font-size: small;">– </span><span style="font-size: small;">pues, no en vano, los objetos alejados se perciben con
menor nitidez </span><span style="font-size: small;">–</span><span style="font-size: small;">desapareciendo incluso del campo visual</span><span style="font-size: small;">– </span><span style="font-size: small;">y para ver bien hay que hacer
incidir la vista </span><span style="font-size: small;">–</span><span style="font-size: small;">el eje del cono visual</span><span style="font-size: small;">– </span><span style="font-size: small;">sobre el objeto, como pone de
manifiesto el que la visión periférica sea reducida).</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">Una teoría sobre el proceso
de la visión, y el libro de Ptolomeo en gran medida lo es, debe ser capaz de
dar una explicación articulada sobre el modo en que se capta la distancia y la
orientación de los objetos o, expresado de otro modo, con esa teoría debe poder
organizarse coherentemente el espacio circundante.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">¿Cómo se trata, pues, este
asunto en el libro?</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">La longitud de los rayos y
la oblicuidad en relación al eje visual no sólo determinan la agudeza visual
sino que, además, determinan la percepción espacial que está íntimamente ligada
a la aprehensión de la distancia y la orientación. La primera se detecta
mediante la longitud de los rayos que están dotados de la capacidad de
"sentir" su extensión medida desde el centro visual; la orientación
es atrapada de dos modos, en uno de ellos se admite que los rayos poseen la
capacidad de aprehender su desviación derecha -izquierda y arriba- abajo en
relación al eje óptico; el otro implica un análisis comparativo de las longitudes
de todos los rayos que inciden sobre la superficie del objeto. En ambos casos
el referente básico es el eje visual, en relación con el cual se determinan en
última instancia la izquierda, la derecha, arriba y abajo así como la
inclinación. Se define así un sistema de coordenadas tridimensional que permite
integrar en él todo el campo visual y en él se es capaz de detectar posiciones,
dimensiones, formas y movimientos de los objetos que se encuentran en él.</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">El tono del libro de
Ptolomeo podemos percibirlo presentando el modo en que aborda alguno de esos
diferentes aspectos de la visión y en concreto uno de los temas presentados
anteriormente al ilustrar la teoría de Euclides (la aprehensión del tamaño de
los objetos).</span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="text-align: justify;">
<span style="font-size: small;">A su juicio, Euclides,
resuelve este asunto de un modo excesivamente simplista usando solo argumentos
geométricos que se apoyan en la medida del ángulo visual. Para Ptolomeo también
es necesario, además, tomar en consideración la oblicuidad y la distancia (en
su análisis sostendrá pues que la distancia y la oblicuidad son perceptibles
por el sujeto que observa y por ello el proceso de aprehensión no es
estrictamente geométrico) aunque su "peso" sea menor que el de aquél.</span></div>
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<span style="font-size: small;">Así, en el libro II,
escribirá:</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><b>Ejemplo II.1:</b></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><i>Si dos magnitudes, AB y GD,
tienen la misma orientación y subtienden el mismo ángulo en E, entonces, como
AB no se encuentra a la misma distancia de E que </i></span><span style="font-size: small;"><i>GD</i> <i>sino que está más próxima, AB</i><i> </i><i>no aparecerá nunca mayor
que </i></span><span style="font-size: small;"><i>GD </i><i>como podría suponerse dada
su proximidad. En lugar de ello aparecerá más pequeña (cuando la distancia que
las separa sea perceptible) o aparecerá igual (cuando la diferencia en la
distancia relativa sea imperceptible).</i></span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjwQC4VGPDiG5-1iFX96yKlTgEJwo7dg5BUdaF2tvjbeKj3h0iVnbRYNFWpAcbMq05qV_lK3DNfQqr378q5LVeSWcxIae1brAKwbGc_LyauBy88bzXMGhMrmWz2sDpGXH_wFRCYy1h4l3s/s1600/Figura03.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjwQC4VGPDiG5-1iFX96yKlTgEJwo7dg5BUdaF2tvjbeKj3h0iVnbRYNFWpAcbMq05qV_lK3DNfQqr378q5LVeSWcxIae1brAKwbGc_LyauBy88bzXMGhMrmWz2sDpGXH_wFRCYy1h4l3s/s320/Figura03.jpg" width="300" /></a></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><b>Ejemplo II. 2:</b></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><i>De igual modo, si hay
dos magnitudes AB y </i></span><span style="font-size: small;"><i>GD </i><i>que
subtienden un mismo ángulo en E y se hallan a la misma distancia de este punto pero
su orientación es distinta, de modo que AB se halla directamente enfrente
mientras que la otra, GD, se encuentra situada oblicuamente, entonces AB no
aparecerá nunca mayor que GD. Por el contrario, aparecerá más pequeña que GD
</i><i>(cuando la diferencia de orientación sea perceptible) o, en todo caso, igual
(cuando la diferencias de orientación sea imperceptible).</i></span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3oFP_gueI6vIToOE8bIV31G84N-9sWP5fEq3UlpLr5W-29dXLNitVlxcEyZOXSkN1vcINwWQh9T8lbo_iEF_vMdfps6IA-qGwl0cPPrmZ2Uvljpj1kx_JA7Rc2dQ_h0PkRbiJ90bHOF8/s1600/Figura04.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="310" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj3oFP_gueI6vIToOE8bIV31G84N-9sWP5fEq3UlpLr5W-29dXLNitVlxcEyZOXSkN1vcINwWQh9T8lbo_iEF_vMdfps6IA-qGwl0cPPrmZ2Uvljpj1kx_JA7Rc2dQ_h0PkRbiJ90bHOF8/s320/Figura04.jpg" width="320" /></a></span></div>
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<span style="font-size: small;"><i>Parece, por tanto, que
la comparación de medidas entre estos objetos proviene del juicio más que de la
naturaleza efectiva de la orientación o la distancia </i></span><span style="font-size: small;"><i>(...)</i></span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhC6LC51xLt_w7Ys9UkYxxAALpbaYxEU5CYVzXPURBbakkQJg-fFXeAexx9H9IUJSmhUr-eJuxZBmqrw0-N6KOEQsrJWNPc0gz9TQ1fZTaRIj2bmkE_GE0uQPneNEStELr8QZiK544knOU/s1600/Figura05.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhC6LC51xLt_w7Ys9UkYxxAALpbaYxEU5CYVzXPURBbakkQJg-fFXeAexx9H9IUJSmhUr-eJuxZBmqrw0-N6KOEQsrJWNPc0gz9TQ1fZTaRIj2bmkE_GE0uQPneNEStELr8QZiK544knOU/s320/Figura05.jpg" width="300" /></a></span></div>
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<span style="font-size: small;"><b>Ejemplo II. 3:</b></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><i>Si en la figura
correspondiente al ejemplo II.1, dibujamos el ángulo formado por las líneas HZE
y ETK, entonces la magnitud </i></span><span style="font-size: small;"><i>GD </i><i>aparecerá
siempre mayor que ZT, porque está mas alejada y el ángulo subtendido es mayor.
Pero HK no aparecerá nunca mayor que AB ya que el juicio basado en el ángulo no
es compensado por un juicio que se base sólo en la distancia. No obstante, HK
aparecerá menor que AB si las distancias y ángulos difieren sensiblemente pero
cuando esta diferencia sea imperceptible, las magnitudes aparecerán iguales
como sucedía en el caso ejemplificado en II.1.</i></span></div>
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<span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgdxykbY7JG7p10HZ1FXFl-o5U5rDcqKwnF0mq1u_NaRJ5oa1zJsoTcjx5VEfQoZw4Dt6WNMma8X0UeJFZfdiEMAbJk81OKpcJQzTDyv-o1Fus7s38I7LOJ9b4EBphL1O0YuAHqJwkPPJ4/s1600/Figura06.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgdxykbY7JG7p10HZ1FXFl-o5U5rDcqKwnF0mq1u_NaRJ5oa1zJsoTcjx5VEfQoZw4Dt6WNMma8X0UeJFZfdiEMAbJk81OKpcJQzTDyv-o1Fus7s38I7LOJ9b4EBphL1O0YuAHqJwkPPJ4/s320/Figura06.jpg" width="269" /></a></span></div>
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<span style="font-size: small;"><b>Ejemplo II. 4</b></span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-size: small;"><i>Si en la figura
correspondiente al ejemplo II.2, </i></span><span style="font-size: small;">(...
) <i>construimos el ángulo formado por las líneas KTE y EZH, la magnitud GD
</i><i>aparecerá siempre mayor que ZK porque la dimensión del ángulo subtendido y
la oblicuidad conspiran conjuntamente para hacerla aparecer mayor. Además, HT
nunca aparecerá mayor que AB porque el juicio basado en el ángulo no es
compensado por el juicio basado solamente sobre la orientación. HT aparecerá
más pequeña que AB si la oblicuidad y los ángulos difieren perceptiblemente
mientras que aparecerán iguales si su diferencia es imperceptible.</i></span></div>
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<span style="font-size: small;">Además del tratamiento de
las ilusiones ópticas, para las que establece una clasificación según que
puedan atribuirse a factores objetivos o a causas subjetivas, el tratado de
Ptolomeo se ocupa en los libros III y IV de la reflexión <i>(Catóptrica) </i>y en
el V de la refracción <i>(Dióptrica). </i>El estudio de este último fenómeno
tendrá, con posterioridad, una influencia fundamental sobre el desarrollo de la
teoría de la visión.</span></div>
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<br />miguelhttp://www.blogger.com/profile/18387320215601142560noreply@blogger.com0