The retraction relation for biracks

Abstract

In Set-theoretical solutions to the quantum Yang-Baxter equation (Duke Math. J. 100 (1999), 169--209), Etingof, Schedler and Soloviev introduced, for each non-degenerate involutive set-theoretical solution (X,σ,τ) of the Yang-Baxter equation, the equivalence relation defined on the set X and they considered a new non-degenerate involutive induced retraction solution defined on the quotient set X. It is well known that translating set-theoretical non-degenerate solutions of the Yang-Baxter equation into the universal algebra language we obtain an algebra called a birack. In the paper we introduce the generalized retraction relation ≈ on a birack, which is equal to in an involutive case. We present a complete algebraic proof that the relation ≈ is a congruence of the birack. Thus we show that the retraction of a set-theoretical non-degenerate solution is well defined not only in the involutive case but also in the case of all non-involutive solutions.