The rates of growth in an acylindrically hyperbolic group

Abstract

Let G be an acylindrically hyperbolic group on a δ-hyperbolic space X. Assume there exists M such that for any finite generating set S of G, the set SM contains a hyperbolic element on X. Suppose that G is equationally Noetherian. Then we show the set of the growth rates of G is well-ordered (Theorem 1.1). The conclusion was known for hyperbolic groups, and this is a generalization. Our result applies to all lattices in simple Lie groups of rank-1 (Theorem 1.3), and more generally, some family of relatively hyperbolic groups (Theorem 1.2). It also applies to the fundamental group, of exponential growth, of a closed orientable 3-manifold except for the case that the manifold has Sol-geometry (Theorem 5.7).