English

Growth Tight Actions

Group Theory 2016-01-20 v4 Geometric Topology

Abstract

We introduce and systematically study the concept of a growth tight action. This generalizes growth tightness for word metrics as initiated by Grigorchuk and de la Harpe. Given a finitely generated, non-elementary group GG acting on a GG--space X\mathcal{X}, we prove that if GG contains a strongly contracting element and if GG is not too badly distorted in X\mathcal{X}, then the action of GG on X\mathcal{X} is a growth tight action. It follows that if X\mathcal{X} is a cocompact, relatively hyperbolic GG--space, then the action of GG on X\mathcal{X} is a growth tight action. This generalizes all previously known results for growth tightness of cocompact actions: every already known example of a group that admits a growth tight action and has some infinite, infinite index normal subgroups is relatively hyperbolic, and, conversely, relatively hyperbolic groups admit growth tight actions. This also allows us to prove that many CAT(0) groups, including flip-graph-manifold groups and many Right Angled Artin Groups, and snowflake groups admit cocompact, growth tight actions. These provide first examples of non-relatively hyperbolic groups admitting interesting growth tight actions. Our main result applies as well to cusp uniform actions on hyperbolic spaces and to the action of the mapping class group on Teichmueller space with the Teichmueller metric. Towards the proof of our main result, we give equivalent characterizations of strongly contracting elements and produce new examples of group actions with strongly contracting elements.

Keywords

Cite

@article{arxiv.1401.0499,
  title  = {Growth Tight Actions},
  author = {Goulnara N. Arzhantseva and Christopher H. Cashen and Jing Tao},
  journal= {arXiv preprint arXiv:1401.0499},
  year   = {2016}
}

Comments

29 pages, 4 figures v2 added references v3 40 pages, 6 figures, expanded preliminary sections to make paper more self-contained, other minor improvements v4 updated bibliography, to appear in Pacific Journal of Mathematics

R2 v1 2026-06-22T02:38:22.669Z