Quantization of the universal centralizer and central D-modules

Abstract

The group scheme of universal centralizers of a complex reductive group G has a quantization called the spherical nil-DAHA. The category of modules over this ring is equivalent, as a symmetric monoidal category, to the category of bi-Whittaker D-modules on G. We construct a braided monoidal equivalence, called the Knop-Ng\o functor, of this category with a full monoidal subcategory of the abelian category of Ad(G)-equivariant D-modules, establishing a D-module abelian counterpart of an equivalence established by Bezrukavnikov and Deshpande, in a different way. As an application of our methods, we prove conjectures of Ben-Zvi and Gunningham by relating this equivalence to parabolic induction and prove a conjecture of Braverman and Kazhdan in the D-module setting.