Uniformization of semistable bundles on elliptic curves

Abstract

Let G be a connected reductive complex algebraic group, and E a complex elliptic curve. Let GE denote the connected component of the trivial bundle in the stack of semistable G-bundles on E. We introduce a complex analytic uniformization of GE by adjoint quotients of reductive subgroups of the loop group of G. This can be viewed as a nonabelian version of the classical complex analytic uniformization E C*/qZ. We similarly construct a complex analytic uniformization of G itself via the exponential map, providing a nonabelian version of the standard isomorphism C* C/Z, and a complex analytic uniformization of GE generalizing the standard presentation E = C/(Z Z τ ). Finally, we apply these results to the study of sheaves with nilpotent singular support. As an application to Betti geometric Langlands conjecture in genus 1, we define a functor from ShN(GE) (the semistable part of the automorphic category) to IndCohN(Locsys G (E)) (the spectral category).