On Exponential Sums, Nowton identities and Dickson Polynomials over Finite Fields

Abstract

Let Fq be a finite field, Fqs be an extension of Fq, let f(x)∈ Fq[x] be a polynomial of degree n with (n,q)=1. We present a recursive formula for evaluating the exponential sum Σc∈ Fqs(s)(f(x)). Let a and b be two elements in Fq with a≠ 0, u be a positive integer. We obtain an estimate for the exponential sum Σc∈ F*qs(s)(acu+bc-1), where (s) is the lifting of an additive character of Fq. Some properties of the sequences constructed from these exponential sums are provided also.