A universal-algebra and combinatorial approach to the set-theoretic Yang-Baxter equation (2305.14138v1)

Abstract: We introduce a new variety of set-theoretic non-associative algebras, P{\l}onka bi-magmas, to describe and classify all solutions of the set-theoretic Yang-Baxter (YB) equation of Baaj-Long-Skandalis (BLS) type. We also study new classes of YB-solutions (bi-connected, simple), and classify the BLS-solutions that fit into those classes. There are only countably many isomorphism classes of simple BLS-solutions, for instance, and they are all describable in terms of the odometer transformations familiar from ergodic theory. Placing Drinfel'd's problem of classifying the set-theoretic solutions of the Yang-Baxter equation in a universal-algebra context with a combinatorial flavor, we also prove the existence of adjunctions between various categories of solutions.