Newton polygons for twisted exponential sums and polynomials P(xd)
Abstract
We study the p-adic absolute value of the roots of the L-functions associated to certain twisted character sums, and additive character sums associated to polynomials P(xd), when P varies among the space of polynomial of fixed degree e over a finite field of characteristic p. For sufficiently large p, we determine in both cases generic Newton polygons for these L-functions, which is a lower bound for the Newton polygons, and the set of polynomials of degree e for which this generic polygon is attained. In the case of twisted sums, we show that the lower polygon defined in as1 is tight when p 1 [de], and that it is the actual Newton polygon for any degree e polynomial.
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