A non-quasiconvex embedding of relatively hyperbolic groups

Abstract

For any finitely generated, non-elementary, torsion-free group G that is hyperbolic relative to P, we show that there exists a group G* containing G such that G* is hyperbolic relative to P and G is not relatively quasiconvex in G*. This generalizes a result of I. Kapovich for hyperbolic groups. We also prove that any torsion-free group G that is non-elementary and hyperbolic relative to P, contains a rank 2 free subgroup F such that the group generated by "randomly" chosen elements r1,...,rm in F is aparabolic, malnormal in G and quasiconvex relative to P and therefore hyperbolically embedded relative to P.