Quasi-isometric rigidity of subgroups and Filtered ends

Abstract

Let G and H be quasi-isometric finitely generated groups and let P≤ G; is there a subgroup Q (or a collection of subgroups) of H whose left cosets coarsely reflect the geometry of the left cosets of P in G? We explore sufficient conditions for a positive answer. The article consider pairs of the form (G,P) where G is a finitely generated group and P a finite collection of subgroups, there is a notion of quasi-isometry of pairs, and quasi-isometrically characteristic collection of subgroups. A subgroup is qi-characteristic if it belongs to a qi-characteristic collection. Distinct classes of qi-characteristic collections of subgroups have been studied in the literature on quasi-isometric rigidity, we list in the article some of them and provide other examples. The first part of the article proves: if G and H are finitely generated quasi-isometric groups and P is a qi-characteristic collection of subgroups of G, then there is a collection of subgroups Q of H such that (G, P) and (H, Q) are quasi-isometric pairs. The second part of the article studies the number of filtered ends e (G, P) of a pair of groups, a notion introduced by Bowditch, and provides an application of our main result: if G and H are quasi-isometric groups and P≤ G is qi-characterstic, then there is Q≤ H such that e (G, P) = e (H, Q).