Asymmetric dynamics of outer automorphisms

Abstract

We consider the action of an irreducible outer automorphism φ on the closure of Culler--Vogtmann Outer space. This action has north-south dynamics and so, under iteration, points converge exponentially to [Tφ+]. For each N ≥ 3, we give a family of outer automorphisms φk ∈ Out(FN) such that as, k goes to infinity, the rate of convergence of φk goes to infinity while the rate of convergence of φk-1 goes to one. Even if we only require the rate of convergence of φk to remain bounded away from one, no such family can be constructed when N < 3. This family also provides an explicit example of a property described by Handel and Mosher: that there is no uniform upper bound on the distance between the axes of an automorphism and its inverse.