Contracting Boundary of a Cusped Space

Abstract

Let G be a finitely generated group. Cashen and Mackay proved that if the contracting boundary of G with the topology of fellow travelling quasi-geodesics is compact then G is a hyperbolic group. Let H be a finite collection of finitely generated infinite index subgroups of G. Let Gh be the cusped space obtained by attaching combinatorial horoballs to each left cosets of elements of H. In this article, we prove that if the combinatorial horoballs are contracting and Gh has compact contracting boundary then G is hyperbolic relative to H.