Universal virtual braid groups

Abstract

We introduce the universal virtual braid group UVn(c), which provides a unified algebraic framework for virtual braid--type structures with c types of crossings and admits natural quotient maps onto the standard families in the literature. We prove that UVn(c) contains a right-angled Artin subgroup of finite index, yielding strong structural consequences: residual finiteness, linearity, solvability of the word and conjugacy problems, and the Tits alternative. For n 5, the commutator subgroup UVn(c)' is perfect, and every non-abelian finite image contains a subgroup isomorphic to the symmetric group Sn; in particular, Sn is the smallest non-abelian finite quotient. These rigidity phenomena persist under a broad class of natural quotients, including virtual braid, virtual singular braid, virtual twin and multi-virtual braid groups. We further obtain a complete classification of subgroup separability (LERF) and the Howson property for UVn(c) and its pure subgroup PUVn(c), showing that both properties hold precisely for n 3. We also compute the virtual cohomological dimension, determine the center, prove that the finite-index RAAG subgroup is characteristic, and construct explicit finite quotients of UVn(c) whose order is strictly larger than n!.