Uniform independence for Dehn twist automorphisms of a free group

Abstract

McCarthy's Theorem for the mapping class group of a closed hyperbolic surface states that for any two mapping classes σ,τ ∈ Mod(S) there is some power N such that the group σN,τN is either free of rank two or abelian, and gives a geometric criterion for the dichotomy. The analogous statement is false in linear groups, and unresolved for outer automorphisms of a free group. Several analogs are known for exponentially growing outer automorphisms satisfying various technical hypothesis. In this article we prove an analogous statement when σ and τ are linearly growing outer automorphisms of Fr, and give a geometric criterion for the dichotomy. Further, Hamidi-Tehrani proved that for Dehn twists in the mapping class group this independence dichotomy is uniform: N=4 suffices. In a similar style, we obtain an N that depends only on the rank of the free group.