Quantum geometric Langlands correspondence in positive characteristic: the GL(N) case

Abstract

We prove a version of quantum geometric Langlands conjecture in characteristic p. Namely, we construct an equivalence of certain localizations of derived categories of twisted crystalline D-modules on the stack of rank N vector bundles on an algebraic curve C in characteristic p. The twisting parameters are related in the way predicted by the conjecture, and are assumed to be irrational (i.e., not in Fp). We thus extend the results of arXiv:math/0602255 concerning the similar problem for the usual (non-quantum) geometric Langlands. In the course of the proof, we introduce a generalization of p-curvature for line bundles with non-flat connections, define quantum analogs of Hecke functors in characteristic p and construct a Liouville vector field on the space of de Rham local systems on C.