What question did this study set out to answer?

The main aim is to explore the monoidal structure of D-module categories connected to affine algebraic groups and Hopf algebras.

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February 12, 2026

D-convolution categories and Hopf algebras

Key Points

The main aim is to explore the monoidal structure of D-module categories connected to affine algebraic groups and Hopf algebras.
Attached D-module categories to smooth affine algebraic groups.
Examined derived categories and Harish-Chandra bimodules.
Utilized prior works on D-modules and Hecke patterns.
Demonstrated monoidal equivalence to a localization of a DG category.
Established that D-module categories have a braided monoidal structure.
Showed that the equivariant version is locally equivalent to graded Hopf algebra modules.
Provided explicit examples of braiding compatible with existing structures.

Abstract

For a smooth affine algebraic group Formula: see text, one can attach various D-module categories to it that admit convolution monoidal structure. We consider the derived category of D-modules on Formula: see text, the stack Formula: see text and the category of Harish-Chandra bimodules. Combining the work of Beilinson–Drinfeld on D-modules and Hecke patterns with the recent work of the author with Dimofte and Py, we show that each of the above categories (more precisely the equivariant version) is monoidal equivalent to a localization of the DG category of modules of a graded Hopf algebra. As a consequence, we give an explicit braided monoidal structure to the derived category of D-modules on Formula: see text, which when restricted to the heart, recovers the braiding of Bezrukavnikov–Finkelberg–Ostrik.

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