Generalized Yetter-Drinfeld modules, the center of bi-actegories and groupoid-crossed braided bicategories

TL;DR

This paper introduces a generalized notion of Yetter-Drinfeld modules via the $E$-center of bi-actegories, connecting it to double groupoid-crossed braided bicategories and extending the framework of group-crossed categories.

Contribution

It defines the $E$-center for bi-actegories relative to op-monoidal functors and relates it to generalized Yetter-Drinfeld modules, also introducing double groupoid-crossed braided bicategories.

Findings

$E$-center is equivalent to generalized Yetter-Drinfeld modules.

Introduces double groupoid-crossed braided bicategory structure.

Extends Turaev's group-crossed braided categories.

Abstract

We study the notion of the $E$-center $\mathcal{Z}_E(\mathcal{M})$ of a $(\mathcal{C}, \mathcal{D})$-biactegory (or bimodule category) $\mathcal{M}$, relative to an op-monoidal functor $E: \mathcal{C} \to \mathcal{D}$. Specializing this notion to the case $\mathcal{M} = {}_A\mathrm{Mod}$, $\mathcal{C}={}_H\mathrm{Mod}$, $\mathcal{D} = {}_K\mathrm{Mod}$, and $E \simeq C\otimes_H - : {}_H\mathrm{Mod} \to {}_K\mathrm{Mod}$, where $H$ and $K$ are bialgebras, $A$ is an $(H,K)$-bicomodule algebra and $C$ is a $(K,H)$-bimodule coalgebra, we show that this $E$-center is equivalent to the category of generalized Yetter-Drinfeld modules as introduced by Caenepeel, Militaru, and Zhu. We introduce the notion of a double groupoid-crossed braided bicategory, generalizing Turaev's group-crossed braided monoidal categories, and show that generalized Yetter-Drinfeld modules can be organized in a double groupoid-crossed braided bicategory over the groupoids of Galois objects and co-objects.