p-adic estimates of exponential sums on curves

Abstract

The purpose of this article is to prove a ``Newton over Hodge'' result for exponential sums on curves. Let X be a smooth proper curve over a finite field Fq of characteristic p≥ 3 and let V ⊂ X be an affine curve. For a regular function f on V, we may form the L-function L(f,V,s) associated to the exponential sums of f. In this article, we prove a lower estimate on the Newton polygon of L(f,V,s). The estimate depends on the local monodromy of f around each point x ∈ X-V. This confirms a hope of Deligne that the irregular Hodge filtration forces bounds on p-adic valuations of Frobenius eigenvalues. As a corollary, we obtain a lower estimate on the Newton polygon of a curve with an action of Z/pZ in terms of local monodromy invariants.