Relative Hyperbolic Extensions of Groups and Cannon-Thurston Maps

Abstract

Let 1 (K,K1) (G,NG(K1))(Q,Q1) 1 be a short exact sequence of pairs of finitely generated groups with K strongly hyperbolic relative to proper subgroup K1. Assuming that for all g∈ G there exists k∈ K such that gK1g-1=kK1k-1, we prove that there exists a quasi-isometric section s Q G. Further we prove that if G is strongly hyperbolic relative to the normalizer subgroup NG(K1) and weakly hyperbolic relative to K1, then there exists a Cannon-Thurston map for the inclusion iK G.