The structure monoid and algebra of a non-degenerate set-theoretic solution of the Yang-Baxter equation

Abstract

For a finite involutive non-degenerate solution (X,r) of the Yang--Baxter equation it is known that the structure monoid M(X,r) is a monoid of I-type, and the structure algebra K[M(X,r)] over a field K share many properties with commutative polynomial algebras, in particular, it is a Noetherian PI-domain that has finite Gelfand--Kirillov dimension. In this paper we deal with arbitrary finite (left) non-degenerate solutions. Although the structure of both the monoid M(X,r) and the algebra K[M(X,r)] is much more complicated than in the involutive case, we provide some deep insights. In this general context, using a realization of Lebed and Vendramin of M(X,r) as a regular submonoid in the semidirect product A(X,r)(X), where A(X,r) is the structure monoid of the rack solution associated to (X,r), we prove that K[M(X,r)] is a module finite normal extension of a commutative affine subalgebra. In particular, K[M(X,r)] is a Noetherian PI-algebra of finite Gelfand--Kirillov dimension bounded by |X|. We also characterize, in ring-theoretical terms of K[M(X,r)], when (X,r) is an involutive solution. This characterization provides, in particular, a positive answer to the Gateva-Ivanova conjecture concerning cancellativity of M(X,r). These results allow us to control the prime spectrum of the algebra K[M(X,r)] and to describe the Jacobson radical and prime radical of K[M(X,r)]. Finally, we give a matrix-type representation of the algebra K[M(X,r)]/P for each prime ideal P of K[M(X,r)]. As a consequence, we show that if K[M(X,r)] is semiprime then there exist finitely many finitely generated abelian-by-finite groups, G1,…c,Gm, each being the group of quotients of a cancellative subsemigroup of M(X,r) such that the algebra K[M(X,r)] embeds into Mv1(K[G1])×…b× Mvm(K[Gm]).