A Langlands dual realization of coherent sheaves on the nilpotent cone
Abstract
Let G and G be Langlands dual connected reductive groups. We establish a monoidal equivalence of ∞-categories between equivariant quasicoherent sheaves on the formal neighborhood of the nilpotent cone in G and Steinberg-Whittaker D-modules on the loop group of G, as conjectured by Bezrukavnikov. More generally, we establish equivalences between various spectral and automorphic realizations of affine Hecke categories and their modules, confirming conjectures of Bezrukavnikov.
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