On extremal nonexpansive mappings
Abstract
We study the extremality of nonexpansive mappings on a nonempty bounded closed and convex subset of a normed space (therein specific Banach spaces). We show that surjective isometries are extremal in this sense for many Banach spaces, including Banach spaces with the Radon-Nikodym property and all C(K)-spaces for compact Hausdorff K. We also conclude that the typical, in the sense of Baire category, nonexpansive mapping is close to being extremal.
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