Retraction methods and fixed point free maps with null minimal displacements on unit balls

Abstract

In this paper we consider the class of Lipschitz maps on the unit ball BX of a Banach space X, and the question we deal with is whether for any λ>1 there exists a λ-Lipschitz fixed-point free mapping T BX BX with d(T,BX)=0. We also consider its H\"older version. New related results are obtained. We show that if X has a spreading Schauder basis then such mappings can always be built, answering a question posed by the first author in Bar. In the general case, using a recent approach of R. Medina M concerning H\"older retractions of (rn)-flat closed convex sets, we show that for any decreasing null sequence (rn)⊂ R and α∈ (0,1), there exists a fixed-point free mapping T on BX so that \|Tnx - Tn y\|≤ rn(\| x - y\|α +1) for all x, y∈ BX and n∈N.