Set-theoretic solutions of the Yang-Baxter equation associated to weak braces

Abstract

We investigate a new algebraic structure which always gives rise to a set-theoretic solution of the Yang-Baxter equation. Specifically, a weak (left) brace is a non-empty set S endowed with two binary operations + and such that both (S,+) and (S, ) are inverse semigroups and they hold align* a (b+c) = a b - a +a c and a a- = - a + a, align* for all a,b,c ∈ S, where -a and a- are the inverses of a with respect to + and , respectively. In particular, such structures include that of skew braces and form a subclass of inverse semi-braces. Any solution r associated to an arbitrary weak brace S has a behavior close to bijectivity, namely r is a completely regular element in the full transformation semigroup on S× S. In addition, we provide some methods to construct weak braces.