Deformed solutions of the Yang-Baxter equation associated to dual weak braces

Abstract

A dual weak brace is an algebraic structure (S,\,+,\,) including skew braces and giving rise to a set-theoretic solution of the Yang-Baxter equation. We show that such a map belongs to a family of set-theoretic solutions, called deformed solutions, that are defined on S and depending on certain parameters. We prove these elements are exactly those belonging to the distributor of S, i.e., Dr(S)=\z ∈ S \, \, ∀ \, a,b ∈ S (a+b) z=a z-z+b z\, that is a full inverse subsemigroup of (S, ). Regarding S as a strong semilattice [Y, Bα, φα,β] of skew braces Bα, we analyze when Dr(S)=α∈ Y Dr(Bα) and in which cases a deformed solution is the strong semilattices of deformed solutions.