Lipschitz-free spaces and purely 1-unrectifiable metric spaces

Abstract

The Lipschitz-free space F(M) is a canonical linearization of a complete metric space M whose topological dual is the space of Lipschitz functions on M. We review the properties of F(M) when the underlying space M is purely 1-unrectifiable, that is, it contains no bi-Lipschitz copy of a subset of R with positive measure. For compact M, this is equivalent to several Banach space properties of F(M), including the Radon-Nikodým and Schur properties or admitting a predual. We shall see how the study of locally flat Lipschitz functions on M reveals these equivalences, and describe a technique that allows most of them to be transferred to the non-compact setting. This manuscript is an expository text based on results by the author in collaboration with C. Gartland, C. Petitjean and A. Procházka, originally published in a Trans. Amer. Math. Soc. paper, and corresponds to a lecture delivered at the Second Winter School in Geometric Measure Theory at Westlake University, Hangzhou, on February 2026.