English

Expanders and box spaces

Group Theory 2015-09-07 v1 Combinatorics Metric Geometry

Abstract

We consider box spaces of finitely generated, residually finite groups GG, and try to distinguish them up to coarse equivalence. We show that, for n2n\geq 2, the group SLn(Z)SL_n(\mathbb{Z}) has a continuum of box spaces which are pairwise non-coarsely equivalent expanders. Moreover, varying the integer n3n\geq 3, expanders given as box spaces of SLn(Z)SL_n(\mathbb{Z}) are pairwise inequivalent; similarly, varying the prime pp, expanders given as box spaces of SL2(Z[p])SL_2(\mathbb{Z}[\sqrt{p}]) are pairwise inequivalent. A strong form of non-expansion for a box space is the existence of α]0,1]\alpha\in]0,1] such that the diameter of each component XnX_n satisfies diam(Xn)=Ω(Xnα)diam(X_n)=\Omega(|X_n|^\alpha). By a result of Breuillard and Tointon, the existence of such a box space implies that GG virtually maps onto Z\mathbb{Z}: we establish the converse. For the lamplighter group (Z/2Z)Z(\mathbb{Z}/2\mathbb{Z})\wr\mathbb{Z} and for a semi-direct product Z2Z\mathbb{Z}^2\rtimes\mathbb{Z}, such box spaces are explicitly constructed using specific congruence subgroups. We finally introduce the full box space of GG, i.e. the coarse disjoint union of all finite quotients of GG. We prove that the full box space of a group mapping onto the free group F2\mathbb{F}_2 is not coarsely equivalent to the full box space of an SS-arithmetic group satisfying the Congruence Subgroup Property.

Keywords

Cite

@article{arxiv.1509.01394,
  title  = {Expanders and box spaces},
  author = {Ana Khukhro and Alain Valette},
  journal= {arXiv preprint arXiv:1509.01394},
  year   = {2015}
}

Comments

23 pages; comments welcome

R2 v1 2026-06-22T10:49:08.099Z