English

Quantum spaces associated to multipermutation solutions of level two

Quantum Algebra 2008-06-23 v2 Mathematical Physics Combinatorics math.MP Rings and Algebras

Abstract

We study finite set-theoretic solutions (X,r)(X,r) of the Yang-Baxter equation of square-free multipermutation type. We show that each such solution over \C\C with multipermutation level two can be put in diagonal form with the associated Yang-Baxter algebra \Acal(\C,X,r)\Acal(\C,X,r) having a qq-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 \Gcal\Gcal of left actions on XX. We study the structure of \Acal(\C,X,r)\Acal(\C,X,r) and show that they have a \bullet-product form `quantizing' the commutative algebra of polynomials in X|X| variables. We obtain the \bullet-product both as a Drinfeld cotwist for a certain canonical 2-cocycle and as a braided-opposite product for a certain crossed \Gcal\Gcal-module (over any field kk). We provide first steps in the noncommutative differential geometry of \Acal(k,X,r)\Acal(k,X,r) arising from these results. As a byproduct of our work we find that every such level 2 solution (X,r)(X,r) factorises as r=fτf1r=f\circ\tau\circ f^{-1} where τ\tau is the flip map and (X,f)(X,f) is another solution coming from XX as a crossed \Gcal\Gcal-set.

Keywords

Cite

@article{arxiv.0806.2928,
  title  = {Quantum spaces associated to multipermutation solutions of level two},
  author = {Tatiana Gateva-Ivanova and Shahn Majid},
  journal= {arXiv preprint arXiv:0806.2928},
  year   = {2008}
}

Comments

34 pages, 3 figures; minor correction to previous theorem 2.15

R2 v1 2026-06-21T10:51:48.625Z