Sum of short exponential sums with prime numbers
Abstract
For sufficiently large integers K, x, y, and q satisfying K y < x, where f(u) = α un + αn-1un-1 + … + α1 u is a polynomial of degree n with real coefficients, n is a fixed positive integer, α is a real number such that |α - aq| 1q2, (a, q) = 1, q 1 and L = x, an estimate of the form Σk=1K | Σx - y < p x e(kf(p)) | K y ( 1q + 1y + qK yn + 1K2n-1 )2-n-1 Ln22n+1, is obtained, which represents a strengthening and generalization of the corresponding estimate of I.M.Vinogradov. Keywords: short exponential sum of G.Weyl with prime numbers, uniform distribution modulo one, nontrivial estimate, fractional part. Bibliography: 18 references.
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