The bounded approximation property for weakly uniformly continuous type holomorphic mappings

• Autores: Erhan Çaliskan
• Localización: Extracta mathematicae, ISSN-e 0213-8743, Vol. 22, Nº 2, 2007 (Ejemplar dedicado a: Banach space theory: classical topics and new directions. Cáceres 2006), págs. 157-178
• Idioma: inglés
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• Resumen

  • When U is a balanced open subset of a reflexive Banach space E with P(nE) = Pw(nE) 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.