Subgroups of right-angled coxeter groups via stallings-like techniques

Authors

Pallavi Dani, Louisiana State University
Ivan Levcovitz, Technion - Israel Institute of Technology

Document Type

Article

Publication Date

1-1-2021

Abstract

We associate cube complexes called completions to each subgroup of a right-angled Coxeter group (RACG). A completion characterizes many properties of the subgroup such as whether it is quasiconvex, normal, finite-index or torsion-free. We use completions to show that reflection subgroups are quasiconvex, as are one-ended Coxeter subgroups of a 2-dimensional RACG. We provide an algorithm that determines whether a given one-ended, 2-dimensional RACG is isomorphic to some finite-index subgroup of another given RACG. In addition, we answer several algorithmic questions regarding quasiconvex subgroups. Finally, we give a new proof of Haglund’s result that quasiconvex subgroups of RACGs are separable.

Publication Source (Journal or Book title)

Journal of Combinatorial Algebra

First Page

237

Last Page

295

Recommended Citation

Dani, P., & Levcovitz, I. (2021). Subgroups of right-angled coxeter groups via stallings-like techniques. Journal of Combinatorial Algebra, 5 (3), 237-295. https://doi.org/10.4171/JCA/54