p-adic variation of L-functions of exponential sums, I

Abstract

For a polynomial f(x) in (Zp Q)[x] of degree d>2 let L(f p;T) be the L-function of the exponential sum of f p. Let NP(f p) denote the Newton polygon of L(f p;T). Let HP(f) denote the Hodge polygon of f, which is the lower convex hull in the real plane of the points (n,n(n+1)/(2d)) for 0≤ n≤ d-1. We prove that there is a Zariski dense subset U defined over Q in the space Ad of degree-d monic polynomials over Q such that for all f in U(Q) we have p→∞ NP(f p) = HP(f). Moreover, we determine the p-adic valuation of every coefficient of L(f p;T) for p large enough and f in U(Q), and that of L(xd+a x p;T) for all a≠ 0.

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