Calculation of l-adic local Fourier transformations

Abstract

We calculate the local Fourier transformations for a class of Q-sheaves. In particular, we verify a conjecture of Laumon and Malgrange. As an application, we calculate the local monodromy of -adic hypergeometric sheaves introduced by Katz. We also discuss the characteristic p analogue of the Turrittin-Levelt Theorem for D-modules. The method used in this paper can be used to show a conjecture of Ramero which states that the Fourier transformation of an analytic sheaf with meromorphic ramification still has meromorphic ramification.

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