Spaces not containing 1 have weak aproximate fixed point property
Abstract
A nonempty closed convex bounded subset C of a Banach space is said to have the weak approximate fixed point property if for every continuous map f:C C there is a sequence \xn\ in C such that xn-f(xn) converge weakly to 0. We prove in particular that C has this property whenever it contains no sequence equivalent to the standard basis of 1. As a byproduct we obtain a characterization of Banach spaces not containing 1 in terms of the weak topology.
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