Fully exact and fully dualizable module categories

TL;DR

This paper introduces fully exact and fully dualizable module categories over finite braided tensor categories, establishing their properties, classifications, and their role as models for finite tensor 2-categories, with detailed examples involving Hopf algebras.

Contribution

It defines fully exact module categories, explores their properties, and connects them to perfect and dualizable categories, proposing them as models for finite tensor 2-categories.

Findings

Fully exact module categories form a dense subset of exact categories.

Each internal algebra in a fully exact module category is projectively separable.

Classification of fully exact module categories over specific Hopf algebras.

Abstract

We define fully exact module categories, a subclass of exact module categories over a finite braided tensor category that is stable under the relative Deligne product. In contrast, we demonstrate with examples in both zero and non-zero characteristic of the base field that the class of exact module categories is not stable under this product. We also observe in examples that fully exact module categories form a dense subset in the class of exact ones. The monoidal 2-category of fully exact module categories strictly contains those of invertible and separable module categories. In fact, we show that each internal algebra of a fully exact module category is projectively separable, a generalization of separable algebras involving projective objects. In the semisimple case, a module category is fully exact if and only if it is separable. In general, fully exact module categories are not dualizable inside their class, but if they are, they are fully dualizable objects in the monoidal 2-category of finite module categories. We call such module categories perfect. We show that perfect module categories form a rigid monoidal 2-subcategory containing all fully dualizable objects. Therefore, we propose perfect module categories as a model for finite tensor 2-categories. If the braiding is symmetric, a module category is fully exact if and only if it is perfect. As a detailed example, we classify fully exact, and hence perfect, module categories over the symmetric tensor category of modules over Sweedler's four-dimensional Hopf algebra and compute their relative Deligne products, and the categories of 1-morphisms. For a general quasi-triangular Hopf algebra, we analyze when the category of finite-dimensional vector spaces is fully exact. We show that this is not the case for both Sweedler's Hopf algebra and Lusztig's factorizable small quantum group of type $A_1$ at an odd root of unity.