Novel non-involutive solutions of the Yang-Baxter equation from (skew) braces

TL;DR

This paper introduces new non-involutive solutions to the Yang-Baxter equation derived from (skew) braces, expanding the class of known solutions and analyzing their algebraic structures and twists.

Contribution

It generalizes known solutions from braces and skew braces to non-involutive cases, introduces bijective maps, and studies their quantum algebraic properties.

Findings

New non-involutive solutions from (skew) braces

Existence of bijective maps for inverse solutions

Quantum algebra is a quasi-triangular quasi-bialgebra

Abstract

We produce novel non-involutive solutions of the Yang-Baxter equation coming from (skew) braces. These solutions are generalisations of the known ones coming from braces and skew braces, and surprisingly in the case of braces they are not necessarily involutive. In the case of two-sided (skew) braces one can assign such solutions to every element of the set. Novel bijective maps associated to the inverse solutions are also introduced. Moreover, we show that the recently derived Drinfeld twists of the involutive case are still admissible in the non-involutive frame and we identify the twisted $r$-matrices and twisted coproducts. We observe, as in the involutive case that the underlying quantum algebra is not a quasi-triangular bialgebra, as one would expect, but a quasi-triangular quasi-bialgebra. The same applies to the quantum algebra of the twisted $r$-matrices, contrary to the involutive case.