From the function-sheaf dictionary to quasicharacters of p-adic tori

Abstract

We consider the rigid monoidal category of character sheaves on a smooth commutative group scheme G over a finite field k and expand the scope of the function-sheaf dictionary from connected commutative algebraic groups to this setting. We find the group of isomorphism classes of character sheaves on G and show that it is an extension of the group of characters of G(k) by a cohomology group determined by the component group scheme of G. We also classify all morphisms in the category character sheaves on G. As an application, we study character sheaves on Greenberg transforms of locally finite type N\'eron models of algebraic tori over local fields. This provides a geometrization of quasicharacters of p-adic tori.