Discorrelation between primes in short intervals and polynomial phases
Abstract
Let H = Nθ, θ > 2/3 and k ≥ 1. We obtain estimates for the following exponential sum over primes in short intervals: \[ ΣN < n ≤ N+H (n) e(g(n)), \] where g is a polynomial of degree k. As a consequence of this in the special case g(n) = α nk, we deduce a short interval version of the Waring-Goldbach problem.
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