Veronese subalgebras and Veronese morphisms for a class of Yang-Baxter algebras

Abstract

We study d-Veronese subalgebras A(d) of Yang-Baxter algebras AX= A(K, X, r) related to finite nondegenerate involutive set-theoretic solutions (X, r) of the Yang-Baxter equation, where K is a field and d≥ 2 is an integer. We find an explicit presentation of the d-Veronese A(d) in terms of one-generators and quadratic relations. We introduce the notion of a d-Veronese solution (Y, rY), canonically associated to (X,r) and use its Yang-Baxter algebra AY= A(K, Y, rY) to define a Veronese morphism vn,d:AY → AX . We prove that the image of vn,d is the d-Veronese subalgebra A(d), and find explicitly a minimal set of generators for its kernel. The results agree with their classical analogues in the commutative case. We show that the Yang-Baxter algebra A(K, X, r) is a PBW algebra if and only if (X,r) is a square-free solution. In this case the d-Veronese A(d) is also a PBW algebra.