The braided monoidal structures on the category of vector spaces graded by the Klein group

Abstract

Let k be a field, k*=k\0\ and C2 the cyclic group of order 2. In this note we compute all the braided monoidal structures on the category of k-vector spaces graded by the Klein group C2× C2. Actually, for the monoidal structures we will compute the explicit form of the 3-cocycles on C2× C2 with coefficients in k*, while for the braided monoidal structures we will compute the explicit form of the abelian 3-cocycles on C2× C2 with coefficients in k*. In particular, this will allow us to produce examples of quasi-Hopf algebras and weak braided Hopf algebras, out of the vector space k[C2× C2].