On the Action of the Symmetric Group on the Cohomology of Groups Related to (Virtual) Braids

Abstract

In this paper we consider the cohomology of four groups related to the virtual braids of [Kauffman] and [Goussarov-Polyak-Viro], namely the pure and non-pure virtual braid groups (PvBn and vBn, respectively), and the pure and non-pure flat braid groups (PfBn and fBn, respectively). The cohomologies of PvBn and PfBn admit an action of the symmetric group Sn. We give a description of the cohomology modules Hi(PvBn,Q) and Hi(PfBn,Q) as sums of Sn-modules induced from certain one-dimensional representations of specific subgroups of Sn. This in particular allows us to conclude that Hi(PvBn,Q) and Hi(PfBn,Q) are uniformly representation stable, in the sense of [Church-Farb]. We also give plethystic formulas for the Frobenius characteristics of these Sn-modules. We then derive a number of constraints on which Sn irreducibles may appear in Hi(PvBn,Q) and Hi(PfBn,Q). In particular, we show that the multiplicity of the alternating representation in Hi(PvBn,Q) and Hi(PfBn,Q) is identical, and moreover is nil for sufficiently large n. We use this to recover the (previously known) fact that the multiplicity of the alternating representation in Hi(PBn,Q) is nil (here PBn is the ordinary pure braid group). We also give an explicit formula for Hi(vBn,Q) and show that Hi(fBn,Q)=0. Finally, we give Hilbert series for the character of the action of Sn on Hi(PvBn,Q) and Hi(PfBn,Q). An extension of the standard `Koszul formula' for the graded dimension of Koszul algebras to graded characters of Koszul algebras then gives Hilbert series for the graded characters of the respective quadratic dual algebras.