On Banach spaces with the commuting bounded approximation property

## Abstract Some non‐archimedean bounded approximation properties are introduced and studied in this paper. As an application, an affirmative answer is given, for non‐spherically complete base fields, to the following problem, posed in 13, p. 95: Does there exist an absolutely convex edged set __B_

## Abstract We study the bounded approximation property for spaces of holomorphic functions. We show that if __U__ is a balanced open subset of a Fréchet–Schwartz space or (__DFM__ )‐space __E__ , then the space ℋ︁(__U__ ) of holomorphic mappings on __U__ , with the compact‐open topology, has the b

W. Schachermayer showed that even 1-complemented subspaces of Banach spaces with property ␣ can fail this property. However, we prove in this paper that spaces with property ␣ satisfy an hereditary property. We obtain, as a conse-Ž . quence, that spaces with properties ␣ and H cannot be reflexive an

In this paper, we show that the weak nearly uniform smooth Banach spaces have the fixed point property for nonexpansive mappings.