p-Density, exponential sums and Artin-Schreier curves
Abstract
In this paper we define the p-density of a finite subset D⊂Nr, and show that it gives a good lower bound for the p-adic valuation of exponential sums over finite fields of characteristic p. We also give an application: when r=1, the p-density is the first slope of the generic Newton polygon of the family of Artin-Schreier curves associated to polynomials with their exponents in D.
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