Relatively irreducible free subroups in Out(F)

Abstract

We prove that given a finite rank free group F of rank ≥ 3 and two exponentially growing outer automorphisms and φ with dual lamination pairs and φ associated to them, and given a free factor system F with co-edge number ≥ 2, φ, each preserving F, so that the pair (φ, φ), (, ) is independent relative to F, then there ∃ M≥ 1, such that for any integer m,n ≥ M, the group φm, n is a free group of rank 2, all of whose non-trivial elements except perhaps the powers of φ, and their conjugates, are fully irreducible relative to F with a lamination pair which fills relative to F. In addition if both φ, are non-geometric then this lamination pair is also non-geometric. We also prove that the extension groups induced by such subgroups will be relatively hyperbolic under some natural conditions.