Categorical cyclic homology and filtered D-modules on stacks: Koszul duality

Abstract

Motivated by applications to the categorical and geometric local Langlands correspondences, we establish an equivalence between the category of filtered D-modules on a smooth stack X and the category of S1-equivariant ind-coherent sheaves on its formal loop space L X, exchanging compact D-modules with coherent sheaves, and coherent D-modules with continuous ind-coherent sheaves. The equivalence yields a sheaf of categories over A1/Gm whose special fiber is a category of coherent sheaves on stacks appearing in categorical traces, and whose generic fiber is a category of equivariant constructible sheaves.