Uniform growth of groups acting on Cartan-Hadamard spaces

Abstract

Let X be an n-dimensional simply connected manifold of pinched sectional curvature -a2 ≤ K ≤ -1. There exist a positive constant C(n,a) such that for any finitely generated discrete group acting on X, then either is virtually nilpotent or the algebraic entropy Ent () ≥ C(n,a).