Algebraic structures in set-theoretic Yang-Baxter & reflection equations

TL;DR

This paper explores algebraic structures related to set-theoretic solutions of the Yang-Baxter and reflection equations, focusing on involutive solutions, quantum algebras, and reflection sub-algebras.

Contribution

It introduces new properties of solutions, analyzes involutive cases, and connects these to quantum algebras and reflection sub-algebras, advancing the understanding of algebraic structures in integrable models.

Findings

Fundamental properties of set-theoretic Yang-Baxter solutions established.

Construction of lambda parametric solutions and their quantum algebras.

Identification of reflection sub-algebras for Baxterized solutions.

Abstract

We present resent results regarding invertible, non-degenerate solutions of the set-theoretic Yang-Baxter and reflection equations. We recall the notion of braces and we present and prove various fundamental properties required for the solutions of the set theoretic Yang-Baxter equation. We then restrict our attention on involutive solutions and consider lambda parametric set-theoretic solutions of the Yang-Baxter equation and we extract the associated quantum algebra. We also discuss the notion of the Drinfeld twist for involutive solutions and their relation to the Yangian. We next focus on reflections and we derive the associated defining algebra relations for R-matrices being Baxterized solutions of the symmetric group. We show that there exists a ``reflection'' finite sub-algebra for some special choice of reflection maps.