Representations of crossed modules and other generalized Yetter-Drinfel'd modules

TL;DR

This paper unifies various solutions to the Yang-Baxter equation using generalized Yetter-Drinfel'd modules over braided systems, introducing new constructions and categorical frameworks for braidings.

Contribution

It develops a systematic framework for constructing braidings from crossed modules, shelves, and Leibniz algebras within generalized Yetter-Drinfel'd modules, expanding the sources of solutions.

Findings

Unified solutions to Yang-Baxter equation from different algebraic structures

Constructed new braidings including Woronowicz and Hennings types

Identified non-strict pre-tensor categories with interesting associators

Abstract

The Yang-Baxter equation plays a fundamental role in various areas of mathematics. Its solutions, called braidings, are built, among others, from Yetter-Drinfel'd modules over a Hopf algebra, from self-distributive structures, and from crossed modules of groups. In the present paper these three sources of solutions are unified inside the framework of Yetter-Drinfe' d modules over a braided system. A systematic construction of braiding structures on such modules is provided. Some general categorical methods of obtaining such generalized Yetter-Drinfel'd (=GYD) modules are described. Among the braidings recovered using these constructions are the Woronowicz and the Hennings braidings on a Hopf algebra. We also introduce the notions of crossed modules of shelves / Leibniz algebras, and interpret them as GYD modules. This yields new sources of braidings. We discuss whether these braidings stem from a braided monoidal category, and discover several non-strict pre-tensor categories with interesting associators.