The center of the categorified ring of differential operators

Abstract

Let be a derived algebraic stack satisfying some mild conditions. The purpose of this paper is three-fold. First, we introduce and study H(), a monoidal DG category that might be regarded as a categorification of the ring of differential operators on . When = G is the derived stack of G-local systems on a smooth projective curve, we expect H(G) to act on both sides of the geometric Langlands correspondence, compatibly with the conjectural Langlands functor. Second, we construct a novel theory of D-modules on derived algebraic stacks. Contrarily to usual D-modules, this new theory, to be denoted by Dder, is sensitive to the derived structure. Third, we identify the Drinfeld center of H() with Dder(L), the DG category of Dder-modules on the loop stack of .