Linear representations, crystallographic quotients, and twisted conjugacy of virtual Artin groups

Abstract

Virtual Artin groups were recently introduced by Bellingeri, Paris, and Thiel as broad generalizations of the well-known virtual braid groups. For each Coxeter graph , they defined the virtual Artin group VA[], which is generated by the corresponding Artin group A[] and the Coxeter group W[], subject to certain mixed relations inspired by the action of W[] on its root system []. There is a natural surjection VA[] → W[], with the kernel PVA[] representing the pure virtual Artin group. In this paper, we explore linear representations, crystallographic quotients, and twisted conjugacy of virtual Artin groups. Inspired from the work of Cohen, Wales, and Krammer, we construct a linear representation of the virtual Artin group VA[]. As a consequence of this representation, we deduce that if W[] is a spherical Coxeter group, then VA[]/PVA[]' is a crystallographic group of dimension |[]| with the holonomy group W[]. We also classify the torsion elements in VA[]/PVA[]' and determine precisely when two elements are conjugate in this group. Further, we investigate twisted conjugacy, and prove that each right-angled virtual Artin group admit the R∞-property.