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On a Product Related to the Cubic Gauss Sum, III
Published online by Cambridge University Press: 20 November 2018
Abstract
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We have seen, in the previous works [5], [6], that the argument of a certain product is closely connected to that of the cubic Gauss sum. Here the absolute value of the product will be investigated.
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- Copyright © Canadian Mathematical Society 2001
References
[1]
Brinkhuis, J., Normal integral bases and complex conjugation. J. Reine Angew. Math. 375/376 (1987), 157–166.Google Scholar
[2]
Brinkhuis, J., On a comparison of Gauss sums with products of Lagrange resolvents. Compositio Math. 93 (1994), 155–170.Google Scholar
[4]
Heath-Brown, D. R. and Patterson, S. J., The distribution of Kummer sums at prime arguments. J. Reine Angew. Math. 310 (1979), 111–130.Google Scholar
[5]
Ito, H., On a product related to the cubic Gauss sum. J. Reine Angew.Math. 395 (1989), 202–213.Google Scholar
[6]
Ito, H., On a product related to the cubic Gauss sum, II. Nagoya Math. J. 148 (1997), 1–21.Google Scholar
[7]
Loxton, J. H., Products related to Gauss sums. J. Reine Angew.Math. 268/269 (1974), 202–213.Google Scholar
[8]
Matthews, C. R., Gauss sums and elliptic functions: I. The Kummer sum. Invent.Math. 52 (1979), 163–185.Google Scholar
[9]
McGettrick, A. D., A result in the theory of Weierstrass elliptic functions. Proc. LondonMath. Soc. (3) 25 (1972), 41–54.Google Scholar
[10]
Reshetukha, I. V., A product related to the cubic Gauss sum. Ukrainian Math. J. 37 (1985), 611–616.Google Scholar
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