L1 Actions and Embeddings of Property A Spaces

Abstract

We provide several new characterizations of Property A for bounded degree graphs. In particular, we show that (X,d) has Property A if and only if there is a proper gauge ω such that the Lipschitz free space LF(X,ω d) is isomorphic to 1. As a consequence, all finitely generated groups with Property A admit proper uniformly Lipschitz affine actions on 1. Moreover, for groups with finite Nagata dimension, we obtain actions with compression exponent 1. This result applies to higher rank lattices, such as SL(3,Z). We also show that a countable discrete group coarsely embeds into L1 if and only if it admits a proper uniformly Lipschitz affine action on a subspace of L1.