Doctoral Thesis
DOI
https://doi.org/10.11606/T.45.2019.tde-06062019-143955
Document
Author
Full name
Claudia Correa de Andrade Oliveira
E-mail
Institute/School/College
Knowledge Area
Date of Defense
Published
São Paulo, 2014
Supervisor
Committee
Tausk, Daniel Victor (President)
Abad, Jorge Lopez
Ascui, Jorge Tulio Mujica
Ferenczi, Valentin Raphael Henri
Pellegrino, Daniel Marinho
Abad, Jorge Lopez
Ascui, Jorge Tulio Mujica
Ferenczi, Valentin Raphael Henri
Pellegrino, Daniel Marinho
Title in Portuguese
A propriedade da c_o-extensão para retas compactas
Keywords in Portuguese
Espaços de Banach de funções contínuas
Extensão de operadores limitados
Propriedade de Sobczyk
Retas compactas
Extensão de operadores limitados
Propriedade de Sobczyk
Retas compactas
Abstract in Portuguese
No presente trabalho, estudamos a propriedade da c0-extensão no contexto de espaços de funções contínuas denidas numa reta compacta e tomando valores em R. Nosso principal resultado é que se K é uma reta compacta, então todo subespaço fechado e com dual separável de C(K) possui a propriedade da c0-extensão em C(K) e portanto, o espaço C(K) tem a propriedade de Sobczyk. Também apresentamos uma caracterização das funções phi: K --> L contínuas, crescentes e sobrejetoras entre retas compactas para as quais a subálgebra de Banach phi*C(L) possui a propriedade da c0-extensão em C(K).
Title in English
c_0-Extension property for compact lines
Keywords in English
Banach spaces of continuous functions
Compact lines
Extensions of bounded operators
Sobczyk property
Compact lines
Extensions of bounded operators
Sobczyk property
Abstract in English
In this work, we study the c0-extension property in the context of spaces of continuous real-valued functions defined in a compact line. Our main result states that if K is a compact line, then every closed subspace of C(K) with separable dual has the c0-extension property in C(K) and therefore, the space C(K) has the Sobczyk property. We also present a characterization of the continuous order-preserving surjective maps phi : K --> L between compact lines such that the Banach subalgebra phi*C(L) has the c0-extension property in C(K).
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Publishing Date
2019-07-24
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