The braided group of a square-free solution of the Yang-Baxter equation and its group algebra

Abstract

Set-theoretic solutions of the Yang--Baxter equation form a meeting-ground of mathematical physics, algebra and combinatorics. Such a solution (X,r) consists of a set X and a bijective map r:X× X X× X which satisfies the braid relations. In this work we study the braided group G=G(X,r) of an involutive square-free solution (X,r) of finite order n and cyclic index p=p(X,r) and the group algebra k [G] over a field k. We show that G contains a G-invariant normal subgroup Fp of finite index pn, Fp is isomorphic to the free abelian group of rank n. We describe explicitly the quotient braided group G=G/Fp of order pn and show that X is embedded in G. We prove that the group algebra k [G] is a free left (resp. right) module of finite rank pn over its commutative subalgebra k[Fp] and give an explicit free basis. The center of k [G] contains the subalgebra of symmetric polynomials in k [x1p, ·s, xnp]. Classical results on group rings imply that k[G] is a left (and right) Noetherian domain of finite global dimension.