Binomial exponential sums
Abstract
We obtain new bounds of exponential sums modulo a prime p with binomials axk + bxn. In particular, for k=1, we improve the bound of Karatsuba (1967) from O(n1/4 p3/4) to O(p3/4 + n1/3p2/3) for any n, and then use it to improve the bound of Akulinichev (1965) from O(p5/6) to O(p4/5) for n | (p-1). The result is based on a new bound on the number of solutions and of degrees of irreducible components of certain equations over finite fields.
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