Equidistribution and counting of orbit points for discrete rank one isometry groups of Hadamard spaces

Abstract

Let X be a proper, geodesically complete Hadamard space, and \ <Is(X) a discrete subgroup of isometries of X with the fixed point of a rank one isometry of X in its infinite limit set. In this paper we prove that if has non-arithmetic length spectrum, then the Ricks' Bowen-Margulis measure -- which generalizes the well-known Bowen-Margulis measure in the CAT(-1) setting -- is mixing. If in addition the Ricks' Bowen-Margulis measure is finite, then we also have equidistribution of -orbit points in X, which in particular yields an asymptotic estimate for the orbit counting function of . This generalizes well-known facts for non-elementary discrete isometry groups of Hadamard manifolds with pinched negative curvature and proper CAT(-1)-spaces.