Cusped spaces and quasi-isometries of relatively hyperbolic groups

Abstract

A group with a family of subgroups P is relatively hyperbolic if admits a cusp-uniform action on a proper δ--hyperbolic space. We show that any two such spaces for a given group pair are quasi-isometric, provided the spaces have "constant horospherical distortion," a condition satisfied by Groves--Manning's cusped Cayley graph and by all negatively curved symmetric spaces. Consequently the Bowditch boundary admits a canonical quasisymmetric structure, which coincides with the "naturally occurring" quasisymmetric structure of the symmetric space when considering lattices in rank one symmetric spaces. We show that a group is a lattice in a negatively curved symmetric space X if and only if a cusped space for is quasi-isometric to the symmetric space. We also prove an ideal triangle characterization of the δ--hyperbolic spaces with uniformly perfect boundary due to Meyer and Bourdon--Kleiner. An appendix concerns the equivalence of several definitions of conical limit point found in the literature.