Algebraic Ending Laminations and Quasiconvexity

Abstract

We explicate a number of notions of algebraic laminations existing in the literature, particularly in the context of an exact sequence 1 H G Q 1 of hyperbolic groups. These laminations arise in different contexts: existence of Cannon-Thurston maps; closed geodesics exiting ends of manifolds; dual to actions on -trees. We use the relationship between these laminations to prove quasiconvexity results for finitely generated infinite index subgroups of H, the normal subgroup in the exact sequence above.