Virtual braid groups, virtual twin groups and crystallographic groups
Group Theory
2023-06-05 v2 Geometric Topology
Abstract
Let . Let (resp. ) be the virtual braid group (resp. the pure virtual braid group), and let (resp. ) be the virtual twin group (resp. the pure virtual twin group). Let be one of the following quotients: or where is the commutator subgroup of . In this paper, we show that is a crystallographic group and we characterize the elements of finite order and the conjugacy classes of elements in . Furthermore, we realize explicitly some Bieberbach groups and infinite virtually cyclic groups in . Finally, we also study other braid-like groups (welded, unrestricted, flat virtual, flat welded and Gauss virtual braid group) module the respective commutator subgroup in each case.
Cite
@article{arxiv.2110.02392,
title = {Virtual braid groups, virtual twin groups and crystallographic groups},
author = {Oscar Ocampo and Paulo Cesar Cerqueira dos Santos Júnior},
journal= {arXiv preprint arXiv:2110.02392},
year = {2023}
}
Comments
In this new version some general results were added in Section 2