Please use this identifier to cite or link to this item: http://hdl.handle.net/10662/15641
Title: The bounded approximation property for weakly uniformly continuous type holomorphic mappings
Authors: Çalıșkan, Erhan
Keywords: Espacios de Banach;Espacios localmente convexos;Propiedad de aproximación acotada;Holomorfos mapeos de tipo acotado;Funciones débilmente uniformemente continuas;Holomorfas acotadas asignaciones
Issue Date: 2007
Publisher: Universidad de Extremadura, Servicio de Publicaciones
Abstract: When 𝑈 is a balanced open subset of a reflexive Banach space 𝐸 with 𝑃 (ⁿ 𝐸) = Pw(ⁿ 𝐸) for every positive integer 𝑛, we show that the predual of the space of weakly uniformly continuous holomorphic mappings on 𝑈, 𝐺wu(𝑈), has the bounded approximation property if and only if 𝐸 has the bounded approximation property if and only if 𝑃(ⁿ𝐸) has the bounded approximation property for every positive integer 𝑛. An analogous result is established for the predual of the space of holomorphic mappings of bounded type also. Key words: Banach spaces, locally convex spaces, bounded approximation property, holomorphic mappings of bounded type, weakly uniformly continuous functions, bounded holomorphic mappings.
URI: http://hdl.handle.net/10662/15641
ISSN: 0213-8743
Appears in Collections:Extracta Mathematicae Vol. 22, nº 2 (2007)

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