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Counting the Number of Solutions of Congruences

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Applications of Fibonacci Numbers

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Abstract

The following proposition is well known.

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References

  1. Cerruti, U. and Vaccarino, F. “From cyclotomic extensions to generalized Ramanujan sums through the Winograd transform”. Preprint.

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  2. Dickson, L.E. “Cyclotomy, higher congruences, and Warings’s problem” American J. Math., Vol. 57 (1935): pp. 391–424.

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  7. McCarthy, P.J. Introduction to Arithmetic Functions. New York: Springer-Verlag, 1986.

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  9. Vinogradov, I.M. The Method of Trigonometrical Sums in Number Theory. London: Intersience Publishers, 1954.

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Authors
  1. Umberto Cerruti
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Editor information

Editors and Affiliations

  1. Computer Science Department, South Dakota State University, Box 2201, Brookings, South Dakota, 57007-0194, USA

    Gerald E. Bergum

  2. Ministry of Education, Government House Z 50, Nicosia, Cyprus

    Andreas N. Philippou

  3. Department of Mathematics, Statistics and Computer Science, University of New England, Armidale, New South Wales, 2351, Australia

    Alwyn F. Horadam

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© 1993 Springer Science+Business Media Dordrecht

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Cerruti, U. (1993). Counting the Number of Solutions of Congruences. In: Bergum, G.E., Philippou, A.N., Horadam, A.F. (eds) Applications of Fibonacci Numbers. Springer, Dordrecht. https://doi.org/10.1007/978-94-011-2058-6_9

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  • DOI: https://doi.org/10.1007/978-94-011-2058-6_9

  • Publisher Name: Springer, Dordrecht

  • Print ISBN: 978-94-010-4912-2

  • Online ISBN: 978-94-011-2058-6

  • eBook Packages: Springer Book Archive

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