From local to global conjugacy of subgroups of relatively hyperbolic groups

Abstract

Suppose that a finitely generated group G is hyperbolic relative to a collection of subgroups P=\P1,…,Pm\. Let H1,H2 be subgroups of G such that H1 is relatively quasiconvex with respect to P and H2 is not parabolic. Suppose that H2 is elementwise conjugate into H1. Then there exists a finite index subgroup of H2 which is conjugate into H1. The minimal length of the conjugator can be estimated. In the case where G is a limit group, it is sufficient to assume only that H1 is a finitely generated and H2 is an arbitrary subgroup of G.