Improved bounds on Gauss sums in arbitrary finite fields
Abstract
Let q be a power of a prime and let Fq be the finite field consisting of q elements. We establish new explicit estimates on Gauss sums of the form Sn(a) = Σx∈ Fqa(xn), where a is a nontrivial additive character. In particular, we show that one has a nontrivial upper bound on |Sn(a)| for certain values of n of order up to q1/2 + 1/68. Our results improve on the previous best known bound, due to Zhelezov.
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