A tree-network has the fixed point property

We use a newly introduced concept of neocompactness to study problems from metric fixed point theory. In particular, we give a sufficient condition for a superreflexive Banach space X to have the fixed point property and obtain shorter proofs of some well-known results in that theory.  2002 Elsevie

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

Connections between reflexivity and the fixed-point property for nonexpansive self-mappings of nonempty, closed, bounded, convex subsets of a Banach space are 1 Ž . ϱ investigated. In particular, it is shown that l ⌫ for uncountable sets ⌫ and l cannot even be renormed to have the fixed-point prope

A number of Banach space properties have previously been shown to imply the weak fixed point property. We investigate various connections between these properties.

Every non-reflexive subspace of K(H), the space of compact operators on a Hilbert space H, contains an asymptotically isometric copy of c 0 . This, along with a result of Besbes, shows that a subspace of K(H) has the fixed point property if and only if it is reflexive.