Isoperimetric Profiles and Regular Embeddings of locally compact groups

Abstract

In this article we extend the notion of Lp-measure subgroups couplings, a quantitative asymmetric version of measure equivalence that was introduced by Delabie, Koivisto, Le Ma\itre and Tessera for finitely generated groups, to the setting of locally compact compactly generated unimodular groups. As an example of these couplings; using ideas from Bader and Rosendal, we prove a "dynamical criteria" for the existence of regular embeddings between amenable locally compact compactly generated unimodular groups, namely the existence of an L∞-measure subgroup coupling that is coarsely m-to-1. We also prove that the existence of an Lp-measure subgroup that is coarsely m-to-1 implies the monotonicity of the Lp-isoperimetric profile, as well as sublinear version of this result. As a corollary we obtain that the Lp-isoperimetric profile is monotonous under regular embeddings, as well as coarse embeddings, between amenable unimodular locally compact compactly generated groups.