Set-theoretical solutions of the Yang-Baxter and pentagon equations on semigroups

TL;DR

This paper explores set-theoretical solutions to the Yang-Baxter and pentagon equations on semigroups, demonstrating how solutions of the pentagon equation can be used to construct new solutions of the Yang-Baxter equation through a novel method involving matched products.

Contribution

It introduces a new construction method for Yang-Baxter solutions using pentagon solutions on semigroup matched products, extending existing frameworks.

Findings

Solutions of the pentagon equation can generate Yang-Baxter solutions.

A new method for constructing Yang-Baxter solutions from pentagon solutions.

Application of the classical Zappa product in solution construction.

Abstract

The Yang-Baxter and pentagon equations are two well-known equations of Mathematical Physic. If $S$ is a set, a map $s:S\times S\to S\times S$ is said to be a set theoretical solution of the Yang-Baxter equation if $$ s_{23}\, s_{13}\, s_{12} = s_{12}\, s_{13}\, s_{23}, $$ where $s_{12}=s\times id_S$, $s_{23}=id_S\times s$, and $s_{13}=(id_S\times \tau)\,s_{12}\,(id_S\times \tau)$ and $\tau$ is the flip map, i.e., the map on $S\times S$ given by $\tau(x,y)=(y,x)$. Instead, $s$ is called a set-theoretical solution of the pentagon equation if $$ s_{23}\, s_{13}\, s_{12}=s_{12}\, s_{23}. $$ The main aim of this work is to display how solutions of the pentagon equation turn out to be a useful tool to obtain new solutions of the Yang-Baxter equation. Specifically, we present a new construction of solutions of the Yang-Baxter equation involving two specific solutions of the pentagon equation. To this end, we provide a method to obtain solutions of the pentagon equation on the matched product of two semigroups, that is a semigroup including the classical Zappa product.