Character Sheaves on Tori over Local Fields

Abstract

Let K be a complete discrete valuation field with an algebraically closed residue field k and ring of integers O. Let T be a torus defined over K. Let L+T denote the connected commutative pro-algebraic group over k obtained by applying the Greenberg functor to the connected N\'eron model of T over O. Following the work of Serre for the multiplicative group, we first compute the fundamental group π1(L+T). We then study multiplicative local systems (or character sheaves) on L+T and establish a local Langlands correspondence for them. Namely, we construct a canonical isomorphism of abelian groups between the group of multiplicative local systems on L+T and inertial local Langlands parameters for T. Finally, we relate our results to the classical local Langlands correspondence for tori over local fields due to Langlands, via the sheaf-function correspondence.