Quantum spaces associated to multipermutation solutions of level two

Abstract

We study finite set-theoretic solutions (X,r) of the Yang-Baxter equation of square-free multipermutation type. We show that each such solution over with multipermutation level two can be put in diagonal form with the associated Yang-Baxter algebra (,X,r) having a q-commutation form of relations determined by complex phase factors. These complex factors are roots of unity and all roots of a prescribed form appear as determined by the representation theory of finite abelian group of left actions on X. We study the structure of (,X,r) and show that they have a -product form `quantizing' the commutative algebra of polynomials in |X| variables. We obtain the -product both as a Drinfeld cotwist for a certain canonical 2-cocycle and as a braided-opposite product for a certain crossed -module (over any field k). We provide first steps in the noncommutative differential geometry of (k,X,r) arising from these results. As a byproduct of our work we find that every such level 2 solution (X,r) factorises as r=fτ f-1 where τ is the flip map and (X,f) is another solution coming from X as a crossed -set.