Solution to a Problem of Lubelski and an Improvement of a Theorem of His

Andrzej Schinzel

Type: Article

Publication Date: 2011-01-01

Citations: 0

DOI: https://doi.org/10.4064/ba59-2-2

Abstract

The paper consists of two parts, both related to problems of Lubelski, but unrelated otherwise. Theorem 1 enumerates for $a=1,2$ the finitely many positive integers $D$ such that every odd positive integer $L$ that divides $x^2 +Dy^2$ for $(x,y)=1$ has th

Locations

Bulletin of the Polish Academy of Sciences Mathematics - View - PDF

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Works That Cite This (0)

Action	Title	Year	Authors

Works Cited by This (7)

Action	Title	Year	Authors
+	Über die Teiler der Form x²+Dy², II	1931	S. Lubelski
+ PDF Chat	On complex quadratic fields wth class-number two	1975	H. Stärk
+	Nombres de classes des corps quadratiques imaginaires	1984	Joseph Oesterlé
+	Zwei Bemerkungen zu der Arbeit ?Zur Arithmetik der Polynome? von U. Wegner in den Mathematischen Annalen, Bd. 105, S. 628?631	1932	Helmut Hasse
+	On Complex Quadratic Fields with Class-Number Two	1975	H. M. Stark
+	Theory of Groups of Finite Order	1911	G. B. M.
+ PDF Chat	Zur Reduzibilität von Polynomen in der Kongruenztheorie. Zweite Abhandlung	1936	S. Lubelski