English

On two-generator subgroups of mapping torus groups

Group Theory 2025-06-24 v2

Abstract

We prove that if Gϕ=F,ttxt1=ϕ(x),xFG_\phi=\langle F, t| t x t^{-1} =\phi(x), x\in F\rangle is the mapping torus group of an injective endomorphism ϕ:FF\phi: F\to F of a free group FF (of possibly infinite rank), then every two-generator subgroup HH of GϕG_\phi is either free or a (finitary) sub-mapping torus. As an application we show that if ϕOut(Fr)\phi\in \mathrm{Out}(F_r) (where r2r\ge 2) is a fully irreducible atoroidal automorphism then every two-generator subgroup of GϕG_\phi is either free or has finite index in GϕG_\phi.

Keywords

Cite

@article{arxiv.2405.08985,
  title  = {On two-generator subgroups of mapping torus groups},
  author = {Naomi Andrew and Edgar A. Bering and Ilya Kapovich and Peter Shalen and Stefano Vidussi},
  journal= {arXiv preprint arXiv:2405.08985},
  year   = {2025}
}

Comments

18 pages; Primary article by Naomi Andrew, Edgar A. Bering IV, Ilya Kapovich, and Stefano Vidussi with an appendix by Peter Shalen. Updated to incorporate referee's suggestions

R2 v1 2026-06-28T16:27:36.596Z