Weak Compactness and Fixed Point Property for Affine Bi-Lipschitz Maps

Abstract

In this paper we show that if (yn) is a seminormalized sequence in a Banach space which does not have any weakly convergent subsequence, then it contains a wide-(s) subsequence (xn) which admits an equivalent convex basic sequence. This fact is used to characterize weak-compactness of bounded, closed convex sets in terms of the generic fixed point property (G-FPP) for the class of affine bi-Lipschitz maps. This result generalizes a theorem by Benavides, Jap\'on Pineda and Prus previously proved for the class of continuous maps. We also introduce a relaxation of this notion (WG-FPP) and observe that a closed convex bounded subset of a Banach space is weakly compact iff it has the WG-FPP for affine 1-Lipschitz maps. Related results are also proved. For example, a complete convex bounded subset C of a Hlcs X is weakly compact iff it has the G-FPP for the class of affine continuous maps f C X with weak-approximate fixed point nets.