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Primzahlen reell-quadratischer Zahlkörper in Winkelräumen

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Literatur

  1. E. Hecke, Eine neue Art von Zetafunktionen und ihre Beziehungen zur Verteilung der Primzahlen II, Math. Zeitschr.6 (1920), S. 11–51, insbesondere S. 38, Formel (52).

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  2. l.c., § 2.

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  3. H. Rademacher, Zur additiven Primzahltheorie algebraischer Zahlkörper I, Hamburger Abhandlungen3, (1924), S. 120, Hilfssatz 4.

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  4. Siehe z. B. E. Landau, Vorlesungen über Zahlentheorie2 (1927), S. 14, Satz 372.

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Authors and Affiliations

  1. Philadelphia, Pa, USA

    Hans Rademacher

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  1. Hans Rademacher
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Rademacher, H. Primzahlen reell-quadratischer Zahlkörper in Winkelräumen. Math. Ann. 111, 209–228 (1935). https://doi.org/10.1007/BF01472215

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