English

Growth gap in hyperbolic groups and amenability

Group Theory 2018-08-27 v2 Dynamical Systems Functional Analysis

Abstract

We prove a general version of the amenability conjecture in the unified setting of a Gromov hyperbolic group G acting properly cocompactly either on its Cayley graph, or on a CAT(-1)-space. Namely, for any subgroup H of G, we show that H is co-amenable in G if and only if their exponential growth rates (with respect to the prescribed action) coincide. For this, we prove a quantified, representation-theoretical version of Stadlbauer's amenability criterion for group extensions of a topologically transitive subshift of finite type, in terms of the spectral radii of the classical Ruelle transfer operator and its corresponding extension. As a consequence, we are able to show that, in our enlarged context, there is a gap between the exponential growth rate of a group with Kazhdan's property (T) and the ones of its infinite index subgroups. This also generalizes a well-known theorem of Corlette for lattices of the quaternionic hyperbolic space or the Cayley hyperbolic plane.

Keywords

Cite

@article{arxiv.1709.07287,
  title  = {Growth gap in hyperbolic groups and amenability},
  author = {Rémi Coulon and Françoise Dal'Bo and Andrea Sambusetti},
  journal= {arXiv preprint arXiv:1709.07287},
  year   = {2018}
}
R2 v1 2026-06-22T21:50:32.649Z