Growth of quadratic forms under Anosov subgroups

Abstract

Let :→ PSLd(K) be a Zariski dense Borel-Anosov representation, for K equal to R or C. Let o be a form of signature (p,d-p) on Kd (where 0<p<d). Let So be the corresponding geodesic copy of the Riemannian symmetric space of PSO(o), inside the Riemannian symmetric space of PSLd(K). For certain choices of o and every t large enough, we show exponential bounds for the number of γ∈ for which the distance between So and γ·So is smaller than t. Under an extra assumption, satisfied for instance when the boundary of is connected, we show an asymptotic as t→∞ for the counting function relative to a functional in the interior of the dual limit cone.