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The large sieve in algebraic number fields

Published online by Cambridge University Press:  26 February 2010

Robin J. Wilson
Robin J. Wilson
Affiliation:
Jesus College, Oxford.
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The objectjof this paper is to extend to algebraic number fields some of the recent results proved by the large sieve method. In particular we prove generalizations of Bombieri's form of the large sieve inequality [1; Theorem 1] and of the theorems of Davenport and Halberstam [2] and Bombieri [1, 4], on the average distribution of primes in arithmetic progressions.

Type
Research Article
Information
Mathematika , Volume 16 , Issue 2 , December 1969 , pp. 189 - 204
Copyright
Copyright © University College London 1969

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References

1.Bombieri, E., “On the large sieve”, Mathematika, 12 (1965), 201225.CrossRefGoogle Scholar
2.Davenport, H. and Halberstam, H., “Primes in arithmetic progressions”, Michigan Math. J., 13 (1966), 485489.CrossRefGoogle Scholar
3.Gallagher, P. X., “The large sieve”, Mathematika, 14 (1967), 1420.CrossRefGoogle Scholar
4.Gallagher, P. X., “Bombieri's mean value theorem”, Mathematika, 15 (1968), 16.CrossRefGoogle Scholar
5.Landau, E., “Über Ideale und Primideale in Idealklassen”, Math. Zeit., 2 (1918), 52154.CrossRefGoogle Scholar
6.Landau, E., “Verallgemeinerung eines Pólyaschen Satzes auf algebraische Zahlkörper”, Göttinger Nachrichteti (1918), 478488.Google Scholar
7.Landau, E., Algebraische Zahlen (Leipzig, 1918; Chelsea, New York).Google Scholar
8.Mitsui, T., “Generalized prime number theorem”, Japan J. Math., 26 (1956), 142.CrossRefGoogle Scholar
9.Davenport, H., Multiplicative Number Theory (Markham, Chicago, 1967).Google Scholar
10.Hecke, E., Mathematische Werke (Vandenhoeck & Ruprecht, Göttingen 1959), No. 9, 178197.Google Scholar
11.Huxley, M. N., “The large sieve inequality for algebraic number fields”, Mathematika, 15 (1968), 178187.CrossRefGoogle Scholar