Virtual braids and virtual curve diagrams

Abstract

There is a well known injective homomorphism φ: Bn → Aut(Fn) from the classical braid group Bn into the automorphism group of the free group Fn, first described by Artin. This homomorphism induces an action of Bn on Fn that can be recovered by considering the braid group as the mapping class group of Hn (an upper half plane with n punctures) acting naturally on the fundamental group of Hn. Kauffman introduced virtual links as an extension of the classical notion of a link in R3. As in the classical case, there is a corresponding group VBn of virtual braids. In this paper, we will generalize the above action to VBn. We will define a set, VCDn, of "virtual curve diagrams" and define an action of VBn on VCDn. Then, we will show that, as in Artin's case, the action is faithful. This provides a combinatorial solution to the word problem in VBn. Bardakov and Manturov described an extension : VBn→ Aut(Fn+1) of the Artin homomorphism, and raised the question of its injectivity. We find that is not injective by exhibiting a non-trivial virtual braid in the kernel when n=4.