Cycle matrices: A combinatorial approach to the set-theoretic solutions of the Quantum Yang-Baxter Equation

Abstract

An n× n matrix M=[mij] with mij∈ Un=\1,2,…,n\ will be called a cycle matrix if (Un,·) is a cycle set, where i· j=mij. We study these matrices in this article. Using these matrices, we give some recipes to construct solutions, which include the multipermutation level 2 solutions. As an application of these, we construct a multi-permutation solution of level r for all r≥ 1. Our method gives alternate proof that the class of permutation groups of solutions contains all finite abelian groups.