The ball fixed point property in spaces of continuous functions

Abstract

A Banach space X has the ball fixed point property (BFPP) if for every closed ball B and for every nonexpansive mapping T B B, there is a fixed point. We study the BFPP for C(K)-spaces. Our goal is to determine topological properties over K that may determine the failure or fulfillment of the BFPP for the space of continuous functions C(K). We prove that the class of compact spaces K for which the BFPP holds lies between the class of extremally disconnected compact spaces and the class of compact F-spaces. We give a family of examples of F-spaces K for which the BFPP fails. As a result, we prove that for every cardinal , -order completeness or -hyperconvexity of C(K) are not enough for the BFPP and we obtain that ∞/c0 = C(N*) fails BFPP under the Continuum Hypothesis. The space C([0,+∞)*) is also analyzed. It is left as an open problem whether all compact spaces for which the BFPP holds are in fact the extremally disconnected compact sets.