English

Quantifying metric approximations of discrete groups

Group Theory 2020-09-01 v1 Logic

Abstract

We introduce and systematically study a profile function whose asymptotic behavior quantifies the dimension or the size of a metric approximation of a finitely generated group GG by a family of groups F={(Gα,dα,kα,εα)}αI,\mathcal{F}=\{(G_{\alpha}, d_{\alpha}, k_{\alpha}, \varepsilon_{\alpha })\}_{\alpha\in I, } where each group GαG_\alpha is equipped with a bi-invariant metric dαd_{\alpha} and a dimension kαk_{\alpha}, for strictly positive real numbers εα\varepsilon_{\alpha } such that infαεα>0\inf_{\alpha }\varepsilon_{\alpha }>0. Through the notion of a residually amenable profile that we introduce, our approach generalizes classical isoperimetric (aka Folner) profiles of amenable groups and recently introduced functions quantifying residually finite groups. Our viewpoint is much more general and covers hyperlinear and sofic approximations as well as many other metric approximations such as weakly sofic, weakly hyperlinear, and linear sofic approximations.

Keywords

Cite

@article{arxiv.2008.12954,
  title  = {Quantifying metric approximations of discrete groups},
  author = {Goulnara Arzhantseva and Pierre-Alain Cherix},
  journal= {arXiv preprint arXiv:2008.12954},
  year   = {2020}
}

Comments

33 pages

R2 v1 2026-06-23T18:10:47.726Z