Generic Newton polygon for exponential sums in two variables with triangular base

Abstract

Let p be a prime number. Every two-variable polynomial f(x1, x2) over a finite field of characteristic p defines an Artin--Schreier--Witt tower of surfaces whose Galois group is isomorphic to Zp. Our goal of this paper is to study the Newton polygon of the L-functions associated to a finite character of Zp and a generic polynomial whose convex hull is a fixed triangle . We denote this polygon by GNP(). We prove a lower bound of GNP(), which we call the improved Hodge polygon IHP(), and we conjecture that GNP() and IHP() are the same. We show that if GNP() and IHP() coincide at a certain point, then they coincide at infinitely many points. When is an isosceles right triangle with vertices (0,0), (0, d) and (d, 0) such that d is not divisible by p and that the residue of p modulo d is small relative to d, we prove that GNP() and IHP() coincide at infinitely many points. As a corollary, we deduce that the slopes of GNP() roughly form an arithmetic progression with increasing multiplicities.