Expanders and box spaces
Abstract
We consider box spaces of finitely generated, residually finite groups , and try to distinguish them up to coarse equivalence. We show that, for , the group has a continuum of box spaces which are pairwise non-coarsely equivalent expanders. Moreover, varying the integer , expanders given as box spaces of are pairwise inequivalent; similarly, varying the prime , expanders given as box spaces of are pairwise inequivalent. A strong form of non-expansion for a box space is the existence of such that the diameter of each component satisfies . By a result of Breuillard and Tointon, the existence of such a box space implies that virtually maps onto : we establish the converse. For the lamplighter group and for a semi-direct product , such box spaces are explicitly constructed using specific congruence subgroups. We finally introduce the full box space of , i.e. the coarse disjoint union of all finite quotients of . We prove that the full box space of a group mapping onto the free group is not coarsely equivalent to the full box space of an -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