Counting problems for special-orthogonal Anosov representations

Abstract

For positive integers p and q let G:=PSO(p,q) be the projective indefinite special-orthogonal group of signature (p,q). We study counting problems in the Riemannian symmetric space XG of G and in the pseudo-Riemannian hyperbolic space Hp,q-1. Let S⊂ XG be a totally geodesic copy of XPSO(p,q-1). We look at the orbit of S under the action of a projective Anosov subgroup of G. For certain choices of such a geodesic copy we show that the number of points in this orbit which are at distance at most t from S is finite and asymptotic to a purely exponential function as t goes to infinity. We provide an interpretation of this result in Hp,q-1, as the asymptotics of the amount of space-like geodesic segments of maximum length t in the orbit of a point.