Counting conjugacy classes in groups with contracting elements

Abstract

In this paper, we derive an asymptotic formula for the number of conjugacy classes of elements in a class of statistically convex-cocompact actions with contracting elements. Denote by C(o, n) (resp. C'(o, n)) the set of (resp. primitive) conjugacy classes of pointed length at most n for a basepoint o. The main result is an asymptotic formula as follows: C(o, n) C'(o, n) (ω(G)n)n. A similar formula holds for conjugacy classes using stable length. As a consequence of the formulae, the conjugacy growth series is transcendental for all non-elementary relatively hyperbolic groups, graphical small cancellation groups with finite components. As by-product of the proof, we establish several useful properties for an exponentially generic set of elements. In particular, it yields a positive answer to a question of J. Maher that an exponentially generic elements in mapping class groups have their Teichm\"uller axis contained in the principal stratum.