The universal monodromic Arkhipov--Bezrukavnikov equivalence

Abstract

We identify equivariant quasicoherent sheaves on the Grothendieck alteration of a reductive group G with universal monodromic Iwahori--Whittaker sheaves on the enhanced affine flag variety of the Langlands dual group G. This extends a similar result for equivariant quasicoherent sheaves on the Springer resolution due to Arkhipov--Bezrukavnikov. We further give a monoidal identification between adjoint equivariant coherent sheaves on the group G itself and bi-Iwahori--Whittaker sheaves on the loop group of G. These results are used in the sequel to this paper to prove the tame local Betti geometric Langlands conjecture of Ben-Zvi--Nadler. Our proof of fully faithfulness provides an alternative to the argument of Arkhipov--Bezrukavnikov. Namely, while they localize in unipotent directions, we localize in semi-simple directions, thereby reducing fully faithfulness to an order of vanishing calculation in semi-simple rank one.