Geometric Whittaker models and Eisenstein series for Mp2

Abstract

Let X be a smooth projective curve over an algebraically closed field of characteristic >2. Let BunMp2 be the stack of metaplectic bundles on X of rank 2. In this paper we study the derived category of genuine l-adic sheaves on BunMp2 in the framework of the quantum geometric Langlands. We describe the corresponding Whittaker category, develop the theory of geometric Eisenstein series and calculate the most non-degenerate Fourier coefficients of these Eisenstein series. The existing constructions of automorphic sheaves for GLn are based on using Whittaker sheaves. Our calculations lead to a conjectural characterization of the Whittaker sheaf for Mp2, though its existence is not clear. We also formulate a conjectural relation between the quantum Langlands functors and the theta-lifting functors for the dual pair (Mp2, PGL2).