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UBA - CienciaS http://ubacs.com.ar/ubacs/
ejercicio adicional http://ubacs.com.ar/ubacs/viewtopic.php?f=65&t=1732	Página 1 de 1

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Autor:	ALE [ 14 Dic 2009, 13:57 ]
Asunto:	ejercicio adicional
Sean S y T cerrados de R. Sean y continuas tales que Se define en SUT la función dada por f(x)=f_1(x) si x estáen S y f(x)=f_2(x) si x está en T a) demostrar que f es continua b) analizar a en el caso que S y T no se supongan cerrados Idea,... Y ahora???

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Autor:	ezequiels90 [ 14 Dic 2009, 15:10 ]
Asunto:	Re: ejercicio adicional
No se si esta bien, pero yo lo pensé separando los casos de donde esta la sucesión que tomas, o sea: Si esta toda en S, si esta toda en T, si tiene infinitos terminos en S y finitos en T (o viceversa), y si tiene infinitos terminos en S e infinitos en T.

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Autor:	ALE [ 14 Dic 2009, 15:34 ]
Asunto:	Re: ejercicio adicional
SIIII!!! yo lo pensé asi primero pero me encontré con problemas: Si ambos son infinitos no hay problema porque tomás dos subsucesiones de la sucesión original y listo si está toda en S o toda en T tampoco,... es fácil Si los dos son finitos... SUT es compacto y finito luego no tiene ptos de acumulación lugo f es continua y si uno es finito y el otro no...:S:S ahi está la cosa porque primero pensé en tomar una subsucesión que me deje afuera los finitos términos de uno de los conjuntos.... pero... si el conjunto es finito, la sucesión va a tener infinitos trérminos de ese conjunto donde sí o sí habrá repeticiones!! GARCIAS POR CONTESTAR!!!

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Autor:	exequiel131719 [ 15 Dic 2009, 23:55 ]
Asunto:	Re: ejercicio adicional
Este es uno de los lemas de pegado para la continuidad de funciones definidas sobre una cierta partición del espacio total... en fin, creo que se entiende el por qué de ''pegado''. Para resolver el ejercicio, la idea crucial es: Perdón por la desprolijidad; tengo parcial a la mañana... en fin, espero que sirva. Por cierto, con el argumento de sucesiones sale, y si en vez de cerrados son abiertos, anda el mismo argumento inclusive para una familia arbitrari de abiertos(que se peguen bien, esto es, coincidan en los puntos que tienen en común). Si son cerrados, vale para finitos... Saludos.

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