Projections in Lipschitz-free spaces induced by group actions

Abstract

We show that given a compact group G acting continuously on a metric space M by bi-Lipschitz bijections with uniformly bounded norms, the Lipschitz-free space over the space of orbits M/G (endowed with Hausdorff distance) is complemented in the Lipschitz-free space over M. We also investigate the more general case when G is amenable, locally compact or SIN and its action has bounded orbits. Then we get that the space of Lipschitz functions Lip0(M/G) is complemented in Lip0(M). Moreover, if the Lipschitz-free space over M, F(M), is complemented in its bidual, several sufficient conditions on when F(M/G) is complemented in F(M) are given. Some applications are discussed. The paper contains preliminaries on projections induced by actions of amenable groups on general Banach spaces.