English

Virtual braid groups, virtual twin groups and crystallographic groups

Group Theory 2023-06-05 v2 Geometric Topology

Abstract

Let n2n\ge 2. Let VBnVB_n (resp. VPnVP_n) be the virtual braid group (resp. the pure virtual braid group), and let VTnVT_n (resp. PVTnPVT_n) be the virtual twin group (resp. the pure virtual twin group). Let Π\Pi be one of the following quotients: VBn/Γ2(VPn)VB_n/\Gamma_2(VP_n) or VTn/Γ2(PVTn)VT_n/\Gamma_2(PVT_n) where Γ2(H)\Gamma_2(H) is the commutator subgroup of HH. In this paper, we show that Π\Pi is a crystallographic group and we characterize the elements of finite order and the conjugacy classes of elements in Π\Pi. Furthermore, we realize explicitly some Bieberbach groups and infinite virtually cyclic groups in Π\Pi. 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.

Keywords

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

R2 v1 2026-06-24T06:39:09.241Z