Nonexpansive mappings on Banach lattices

Title: Nonexpansive mappings on Banach lattices
Creator: Borwein, Jonathan; Sims, Brailey
Relation: Comptes Rendus Mathématiques de l'Académie des Sciences Vol. 5, p. 21-26
Relation: http://mr.math.ca
Publisher: Royal Society of Canada
Resource Type: journal article
Date: 1983
Description: A mapping T defined on a weakly compact convex subset C of a Banach space X is said to be nonexpansive if ||T(x)-T(y)||≼||x-y|| for all x and y in C; and X is said to have the (weak) fixed point properly (FPP) if every such mapping has a fixed point. Classical results show that every uniformly convex Banach space and those with normal structure have the fixed point property. Until recently other positive results remained fragmentary. Moreover, it was only in 1981 that Alspach showed that L₁ does not have the FPP.
Subject: Banach spaces; mappings; Banach lattices
Identifier: http://hdl.handle.net/1959.13/1042398
Identifier: uon:14044
Identifier: ISSN:0706-1994
Language: eng
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