On unimodular module categories
Abstract
Let be a finite tensor category and an exact left -module category. We call unimodular if the finite multitensor category of right exact -module endofunctors of is unimodular. In this article, we provide various characterizations, properties, and examples of unimodular module categories. As our first application, we employ unimodular module categories to construct (commutative) Frobenius algebra objects in the Drinfeld center of any finite tensor category. When is a pivotal category, and is a unimodular, pivotal left -module category, the Frobenius algebra objects are symmetric as well. Our second application is a classification of unimodular module categories over the category of finite dimensional representations of a finite dimensional Hopf algebra; this answers a question of Shimizu. Using this, we provide an example of a finite tensor category whose categorical Morita equivalence class does not contain any unimodular tensor category.
Cite
@article{arxiv.2302.06192,
title = {On unimodular module categories},
author = {Harshit Yadav},
journal= {arXiv preprint arXiv:2302.06192},
year = {2023}
}
Comments
v2: 32 pages. Final version to appear in Advances in Mathematics