Virtual Artin groups
Abstract
Starting from the observation that the standard presentation of a virtual braid group mixes the standard presentation of the corresponding braid group with the standard presentation of the corresponding symmetric group and some mixed relations that mimic the action of the symmetric group on its root system, we define a virtual Artin group of a Coxeter graph mixing the standard presentation of the Artin group with the standard presentation of the Coxeter group and some mixed relations that mimic the action of on its root system. By definition we have two epimorphisms and whose kernels are denoted by and respectively. We calculate presentations for these two subgroups. In particular is an Artin group. We prove that the center of any virtual Artin group is trivial. In the case where is of spherical type or of affine type, we show that each free of infinity parabolic subgroup of is also of spherical type or of affine type, and we show that has a solution to the word problem. In the case where is of spherical type we show that satisfies the conjecture and we infer the cohomological dimension of and the virtual cohomological dimension of . In the case where is of affine type we determine upper bounds for the cohomological dimension of and for the virtual cohomological dimension of .
Keywords
Cite
@article{arxiv.2110.14293,
title = {Virtual Artin groups},
author = {Paolo Bellingeri and Luis Paris and Anne-Laure Thiel},
journal= {arXiv preprint arXiv:2110.14293},
year = {2021}
}