Ping-pong and Outer space

Abstract

We prove that if φ,∈ Out(FN) are hyperbolic iwips (irreducible with irreducible powers) such that <φ,> Out(FN) is not virtually cyclic then some high powers of φ and generate a free subgroup of rank two, all of whose nontrivial elements are again hyperbolic iwips. Being a hyperbolic iwip element of Out(FN) is strongly analogous to being a pseudo-Anosov element of a mapping class group, so the above result provides analogs of "purely pseudo-Anosov" free subgroups of Out(FN).