Lipschitz-Free Spaces: A Topometric Approach and Group Actions

TL;DR

This paper develops a topometric framework for Lipschitz-free spaces, explores their universal properties, and examines group actions on these spaces, linking metric geometry with topological group dynamics.

Contribution

It introduces a topometric version of Lipschitz-free spaces and analyzes group actions and dynamical systems within this new setting.

Findings

Established a topometric structure for Lipschitz-free spaces.

Analyzed the dual and bidual actions of topological groups on these spaces.

Connected the universal property of Lipschitz-free spaces with group dynamics.

Abstract

We introduce a topometric version of Lipschitz-free spaces and study its universal property. Another aim of this paper is to investigate actions of topological groups $G$ on Lipschitz-free spaces $\mathcal{F}(M)$, induced by isometric actions on pointed metric spaces $M$. In particular, we study the associated dynamical $G$-systems under the weak-star topology, focusing on the dual action on $\mathrm{Lip}_0(M) = \mathcal{F}(M)^*$ and the bidual $\mathcal{F}(M)^{**}$.