Rota-Baxter operators on crossed modules of Lie groups and categorical solutions of the Yang-Baxter equation

TL;DR

This paper introduces Rota-Baxter operators on crossed modules of Lie groups and Lie algebras, constructing categorical solutions to the Yang-Baxter equation and exploring their properties, infinitesimal structures, and integrations.

Contribution

It defines Rota-Baxter operators on crossed modules of Lie groups and Lie algebras, and uses these to construct categorical solutions to the Yang-Baxter equation.

Findings

Constructed categorical solutions of the Yang-Baxter equation.

Established properties of Rota-Baxter operators on crossed modules.

Explored the infinitesimal and integration aspects of these operators.

Abstract

In this paper, we construct a categorical solution $(\huaC, R)$ of the Yang-Baxter equation, i.e. $\huaC$ is a small category and $R: \huaC\times\huaC\lon\huaC\times\huaC$ is an invertible functor satisfying $$ (R\times\Id_\huaC)(\Id_\huaC\times R)(R\times\Id_\huaC)=(\Id_\huaC\times R)(R\times\Id_\huaC)(\Id_\huaC\times R), $$ where $\huaC\times\huaC$ is the product category. First, the notion of Rota-Baxter operators on crossed modules of Lie groups is defined and its various properties are established. Then, we use Rota-Baxter operators on crossed modules of Lie groups to construct categorical solutions of the Yang-Baxter equation. We also study the Rota-Baxter operators on crossed modules of Lie algebras which are infinitesimals of Rota-Baxter operators on crossed modules of Lie groups, they can give connections on manifolds. Finally, we study the integration of Rota-Baxter operators on crossed modules of Lie algebras and the differentials of Rota-Baxter operators on crossed modules of Lie groups.