The Metric Approximation Property and Lipschitz-Free Spaces over Subsets   of $\mathbb{R}^N$

Eva Perneck\'a; Richard J. Smith

arXiv:1501.07036·math.FA·June 14, 2022

The Metric Approximation Property and Lipschitz-Free Spaces over Subsets of $\mathbb{R}^N$

Eva Perneck\'a, Richard J. Smith

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Abstract

We prove that for certain subsets $M \subseteq R^{N}$ , $N ⩾ 1$ , the Lipschitz-free space $F (M)$ has the metric approximation property (MAP), with respect to any norm on $R^{N}$ . In particular, $F (M)$ has the MAP whenever $M$ is a finite-dimensional compact convex set. This should be compared with a recent result of Godefroy and Ozawa, who showed that there exists a compact convex subset $M$ of a separable Banach space, for which $F (M)$ fails the approximation property.

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TopicsAdvanced Banach Space Theory · Fixed Point Theorems Analysis · Optimization and Variational Analysis