Quadratic algebras, Yang-Baxter equation, and Artin-Schelter regularity

Abstract

We study quadratic algebras over a field k. We show that an n-generated PBW algebra A has finite global dimension and polynomial growth iff its Hilbert series is HA(z)= 1 /(1-z)n. Surprising amount can be said when the algebra A has quantum binomial relations, that is the defining relations are nondegenerate square-free binomials xy-cxyzt with non-zero coefficients cxy∈ k. In this case various good algebraic and homological properties are closely related. The main result shows that for an n-generated quantum binomial algebra A the following conditions are equivalent: (i) A is a PBW algebra with finite global dimension; (ii) A is PBW and has polynomial growth; (iii) A is an Artin-Schelter regular PBW algebra; (iv) A is a Yang-Baxter algebra; (v) HA(z)= 1/(1-z)n; (vi) The dual A! is a quantum Grassman algebra; (vii) A is a binomial skew polynomial ring. So for quantum binomial algebras the problem of classification of Artin-Schelter regular PBW algebras of global dimension n is equivalent to the classification of square-free set-theoretic solutions of the Yang-Baxter equation (X,r), on sets X of order n.