On the extended Whittaker category

Abstract

Let G be a connected reductive group, with connected center, and X a smooth complete curve, both defined over an algebraically closed field of characteristic zero. Let BunG denote the stack of G-bundles on X. In analogy with the classical theory of Whittaker coefficients for automorphic functions, we construct a "Fourier transform" functor, called coeffG,ext, from the DG category of D-modules on BunG to a certain DG category Wh(G,ext), called the extended Whittaker category. Combined with work in progress by other mathematicians and the author, this construction allows to formulate the compatibility of the Langlands duality functor LG: IndCoh N(LocSysG) D(BunG) with the Whittaker model. For G=GLn and G=PGLn, we prove that coeffG,ext is fully faithful. This result guarantees that, for those groups, LG is unique (if it exists) and necessarily fully faithful.