Polynomial growth and subgroups of Out(F n)
Abstract
This paper, which is the last of a series of three papers, studies dynamical properties of elements of Out(F n), the outer automorphism group of a nonabelian free group F n. We prove that, for every subgroup H of Out(F n), there exists an element φ ∈ H such that, for every element g of F n, the conjugacy class [g] has polynomial growth under iteration of φ if and only if [g] has polynomial growth under iteration of every element of H.
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