On the distribution of αp modulo 1

R. C. Vaughan

doi:10.1112/S0025579300009025

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In [4] we have given a simple method of estimating trigonometrical sums over prime numbers. Here we show how the argument can be adapted in order to give estimates for the distribution of αp modulo 1 which are sharper than those obtained by I. M. Vinogradov [5], [6]. Vinogradov uses the sieve of Eratosthenes to relate the sum

to the bilinear form

the function μ being the Mobius function. When d1 … ds is small compared with N this can be treated in a fairly straightforward manner. However, in order to treat the terms with d1 …ds close to N, Vinogradov has to introduce an argument of a rather recondite combinatorial nature.

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3.Vaughan, R. C.. “Sommes trigonométriques sur les nombres premiers”, Comptes Rendus Acad. Sc. Paris, Série A, to appear.Google Scholar

4.Vinogradov, I. M.. The method of trigonometrical sums in the theory of numbers, translated from the Russian, revised and annotated by Roth, K. F. and Davenport, A. (Interscience Publishers, 1954).Google Scholar

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