PolExp growth for automorphisms of toral relatively hyperbolic groups

Abstract

Let G be a toral relatively hyperbolic group, and let ∈Aut(G). We prove that, under iteration of , the conjugacy length ||n(g)|| of every element g∈ G grows like ndλn for some d∈N and some algebraic integer λ≥ 1. For a given , only finitely many values of d and λ occur as g varies in G. The same statements hold for the growth of the word length |n(g)|. For G hyperbolic, we generalize polynomial subgroups: we show that, for a given growth type ndλn other than 1, there is a malnormal family of quasiconvex subgroups K1,…,Kp such that a conjugacy class [g] grows at most like ndλn if and only if g is conjugate into one of the subgroups Ki.

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