English

The geometry of groups containing almost normal subgroups

Group Theory 2021-09-15 v1

Abstract

A subgroup HGH\leq G is said to be almost normal if every conjugate of HH is commensurable to HH. If HH is almost normal, there is a well-defined quotient space G/HG/H. We show that if a group GG has type Fn+1F_{n+1} and contains an almost normal coarse PDnPD_n subgroup HH with e(G/H)=e(G/H)=\infty, then whenever GG' is quasi-isometric to GG, it contains an almost normal subgroup HH' that is quasi-isometric to HH. Moreover, the quotient spaces G/HG/H and G/HG'/H' are quasi-isometric. This generalises a theorem of Mosher-Sageev-Whyte, who prove the case in which G/HG/H is quasi-isometric to a finite valence bushy tree. Using work of Mosher, we generalise a result of Farb-Mosher to show that for many surface group extensions ΓL\Gamma_L, any group quasi-isometric to ΓL\Gamma_L is virtually isomorphic to ΓL\Gamma_L. We also prove quasi-isometric rigidity for the class of finitely presented Z\mathbb{Z}-by-(\infty ended) groups.

Keywords

Cite

@article{arxiv.1905.03062,
  title  = {The geometry of groups containing almost normal subgroups},
  author = {Alexander Margolis},
  journal= {arXiv preprint arXiv:1905.03062},
  year   = {2021}
}

Comments

48 pages

R2 v1 2026-06-23T09:00:19.794Z