The large sieve inequality for algebraic number fields

M. N. Huxley

doi:10.1112/S0025579300002540

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The object of this paper is first to generalize the basic inequality of the large sieve method to exponential sums in many variables, and then to deduce results for algebraic number fields that are analogous to known results for the rational field.

References

† “On the large sieve method”, Abhandlungen aus Zahlentheorie und Analysis zur Erinnerung an Edmund Landau (Berlin, 1968).Google Scholar

‡ ║x║ denotes the distance from a real number x to the nearest integer.

† This can be extended to a result involving a sum over squarefree ideals instead of prime ideals, on the lines of Montgomery, H. L.'s paper, J. London Math. Soc, 43 (1968), 93–98.CrossRef Google Scholar

† “The values of a trigonometrical polynomial at well spaced points”, Mathematika, 13 (1966), 91–96;CrossRef Google Scholar see also Corrigendum and Addendum, 14 (1967), 229–232.

† Gallagher, P. X., “The large sieve”, Mathematika, 14 (1967), 14'20.CrossRef Google Scholar

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The large sieve inequality for algebraic number fields

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