English

Hyperbolic extensions of free groups

Geometric Topology 2018-03-16 v2 Group Theory

Abstract

Given a finitely generated subgroup ΓOut(F)\Gamma \le \mathrm{Out}(\mathbb{F}) of the outer automorphism group of the rank rr free group F=Fr\mathbb{F} = F_r, there is a corresponding free group extension 1FEΓΓ11 \to \mathbb{F} \to E_{\Gamma} \to \Gamma \to 1. We give sufficient conditions for when the extension EΓE_{\Gamma} is hyperbolic. In particular, we show that if all infinite order elements of Γ\Gamma are atoroidal and the action of Γ\Gamma on the free factor complex of F\mathbb{F} has a quasi-isometric orbit map, then EΓE_{\Gamma} is hyperbolic. As an application, we produce examples of hyperbolic F\mathbb{F}-extensions EΓE_{\Gamma} for which Γ\Gamma has torsion and is not virtually cyclic. The proof of our main theorem involves a detailed study of quasigeodesics in Outer space that make progress in the free factor complex. This may be of independent interest.

Keywords

Cite

@article{arxiv.1406.2567,
  title  = {Hyperbolic extensions of free groups},
  author = {Spencer Dowdall and Samuel J. Taylor},
  journal= {arXiv preprint arXiv:1406.2567},
  year   = {2018}
}

Comments

50 pages. Minor changes and other updates to incorporate referee comments. Final version; accepted for publication in Geometry & Topology

R2 v1 2026-06-22T04:35:05.720Z