A new Fourier transform

Abstract

In order to define a geometric Fourier transform, one usually works with either -adic sheaves in characteristic p>0 or with D-modules in characteristic 0. If one considers -adic sheaves on the stack quotient of a vector bundle V by the homothety action of Gm, however, Laumon provides a uniform geometric construction of the Fourier transform in any characteristic. The category of sheaves on [V/Gm] is closely related to the category of (unipotently) monodromic sheaves on V. In this article, we introduce a new functor, which is defined on all sheaves on V in any characteristic, and we show that it restricts to an equivalence on monodromic sheaves. We also discuss the relation between this new functor and Laumon's homogeneous transform, the Fourier-Deligne transform, and the usual Fourier transform on D-modules (when the latter are defined).