Deligne-Lusztig duality on the stack of local systems

Abstract

In the setting of the geometric Langlands conjecture, we argue that the phenomenon of divergence at infinity on BunG (that is, the difference between !-extensions and *-extensions) is controlled, Langlands-dually, by the locus of semisimple G-local systems. To see this, we first rephrase the question in terms of Deligne-Lusztig duality and then study the Deligne-Lusztig functor DLG acting on the spectral Langlands DG category IndCohN(LSG). We prove that DLG is the projection IndCohN(LSG) QCoh(LSG), followed by the action of a coherent D-module StG which we call the Steinberg D-module. We argue that StG might be regarded as the dualizing sheaf of the locus of semisimple G-local systems. We also show that DLG, while far from being conservative, is fully faithful on the subcategory of compact objects.