Divisibility of Weil Sums of Binomials

Abstract

Consider the Weil sum WF,d(u)=Σx ∈ F (xd+u x), where F is a finite field of characteristic p, is the canonical additive character of F, d is coprime to |F*|, and u ∈ F*. We say that WF,d(u) is three-valued when it assumes precisely three distinct values as u runs through F*: this is the minimum number of distinct values in the nondegenerate case, and three-valued WF,d are rare and desirable. When WF,d is three-valued, we give a lower bound on the p-adic valuation of the values. This enables us to prove the characteristic 3 case of a 1976 conjecture of Helleseth: when p=3 and [F: F3] is a power of 2, we show that WF,d cannot be three-valued.