Lipschitz extension and Lipschitz-free spaces over nets in normed spaces

Abstract

We consider subsets S of a metric space M such that Lipschitz mappings defined on S can be extended to Lipschitz mappings on M, and we show that the union of such subsets has the same property under appropriate geometric conditions. We then derive several consequences to the isomorphic structure and classification of Lipschitz and Lipschitz-free spaces. Our main result is that the Lipschitz-free space F(M) is isomorphic to its countable 1-sum when M is either a net NX in any Banach space X or the integer grid Z_1 in 1. We also prove that the Lipschitz space Lip0(Z_1) is isomorphic to Lip0(1) and that Lip0(NX) contains a complemented copy of Lip0(X), among other results. This answers questions raised by Albiac, Ansorena, C\'uth and Doucha and Candido, C\'uth and Doucha, respectively, and extends previous results by the same authors as well as H\'ajek and Novotn\'y.