On the hyperbolic orbital counting problem in conjugacy classes

Abstract

Given a discrete group of isometries of a negatively curved manifold M, a nontrivial conjugacy class K in and x0∈ M, we give asymptotic counting results, as t +∞, on the number of orbit points γ x0 at distance at most t from x0, when γ is restricted to be in K, as well as related equidistribution results. These results generalise and extend work of Huber on cocompact hyperbolic lattices in dimension 2. We also study the growth of given conjugacy classes in finitely generated groups endowed with a word metric.