Forbidden relations in universal virtual braid groups

Abstract

We study natural automorphisms of the universal virtual braid group UVn(k). These automorphisms induce commuting involutions in the outer automorphism group and generate a subgroup isomorphic to Z2k×Z2. We then show that the two one-forbidden quotients of UVn(k) are isomorphic. Furthermore, we introduce the universal unrestricted virtual braid group UUVn(k) obtained by imposing simultaneously the two forbidden relations, and derive several structural properties inherited from the universal setting. Since the multi-virtual braid group MkVBn is a quotient of UVn(k), the corresponding results for MkVBn follow as consequences. In particular, for k=1 we prove that the quotients of VBn by the two forbidden relations are isomorphic and obtain structural properties for the unrestricted virtual braid group.