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Displaying 41 – 60 of 458

An investigation of bounds for the regulator of quadratic fields.

Jacobson, Michael J.jun., Lukes, Richard F., Williams, Hugh C. (1995)

Experimental Mathematics

Another look at real quadratic fields of relative class number 1

Debopam Chakraborty, Anupam Saikia (2014)

Acta Arithmetica

The relative class number $H_{d} (f)$ of a real quadratic field K = ℚ (√m) of discriminant d is defined to be the ratio of the class numbers of $_{f}$ and $_{K}$ , where $_{K}$ denotes the ring of integers of K and $_{f}$ is the order of conductor f given by $ℤ + f_{K}$ . R. Mollin has shown recently that almost all real quadratic fields have relative class number 1 for some conductor. In this paper we give a characterization of real quadratic fields with relative class number 1 through an elementary approach considering the cases when...

Arithmetic of Pell surfaces

S. Hambleton, F. Lemmermeyer (2011)

Acta Arithmetica

Arithmetische Eigenschaften hyperbolischer Klassen elliptischer Modulgruppen.

Ulrich Christian (1991)

Mathematische Zeitschrift

Artin's primitive root conjecture for quadratic fields

Hans Roskam (2002)

Journal de théorie des nombres de Bordeaux

Fix an element $α$ in a quadratic field $K$ . Define $S$ as the set of rational primes $p$ , for which $α$ has maximal order modulo $p$ . Under the assumption of the generalized Riemann hypothesis, we show that $S$ has a density. Moreover, we give necessary and sufficient conditions for the density of $S$ to be positive.

Atkin-Lehner involutions and class number residuality

M. Kenku (1977)

Acta Arithmetica

Bases normales d'entiers et unités modulaires.

E.J. Gómez Ayala (1994)

Manuscripta mathematica

Bemerkungen zum Satz von Heegner-Stark über die imaginär-quadratischen Zahlkörper mit der Klassenzahl Eins.

Curt Meyer (1970)

Journal für die reine und angewandte Mathematik

Berechnung von Einheiten nach Lagrange.

Wolfgang Trinks (1978)

Journal für die reine und angewandte Mathematik

Bernoulli numbers, Hurwitz numbers, p-adic L-functions and Kummer's criterion.

Alvaro Lozano Robledo (2007)

RACSAM

Let K = Q(ζp) and let hp be its class number. Kummer showed that p divides hp if and only if p divides the numerator of some Bernoulli number. In this expository note we discuss the generalizations of this type of criterion to totally real fields and quadratic imaginary fields.

Bestimmung einklassiger Geschlechter ternärer quadratischer Formen in reell-quadratischen Zahlkörpern.

Otto Körner (1973)

Mathematische Annalen

Binary forms and unramified An-extensions of quadratic fields.

Jin Nakagawa (1990)

Journal für die reine und angewandte Mathematik

Calcul du nombre de classes d'un corps quadratique imaginaire ou réel, d'après Shanks, Williams, McCurley, A. K. Lenstra et Schnorr

Henri Cohen (1989)

Journal de théorie des nombres de Bordeaux

Dans cette note nous décrivons différentes méthodes utilisées en pratique pour calculer le nombre de classes d'un corps quadratique imaginaire ou réel ainsi que pour calculer le régulateur d'un corps quadratique réel. En particulier nous décrivons l'infrastructure de Shanks ainsi que la méthode sous-exponentielle de McCurley.

Chowla's conjecture

András Biró (2003)

Acta Arithmetica

Class fields towers of imaginary quadratic fields.

Robert Gold, James R. Brink (1986/1987)

Manuscripta mathematica

Class number and factorization in quadratic number fields

W. Narkiewicz (1967)

Colloquium Mathematicae

Class number formulae for imaginary quadratic fields.

R.W. Davis (1976)

Journal für die reine und angewandte Mathematik

Class number formulae for imaginary quadratic fields. II.

R.W. Davis (1978)

Journal für die reine und angewandte Mathematik

Class number one problem for real quadratic fields of a certain type

Kostadinka Lapkova (2012)

Acta Arithmetica

Class Number Two for Real Quadratic Fields of Richaud-Degert Type

Mollin, R. A. (2009)

Serdica Mathematical Journal

2000 Mathematics Subject Classification: Primary: 11D09, 11A55, 11C08, 11R11, 11R29; Secondary: 11R65, 11S40; 11R09.This paper contains proofs of conjectures made in [16] on class number 2 and what this author has dubbed the Euler-Rabinowitsch polynomial for real quadratic fields. As well, we complete the list of Richaud-Degert types given in [16] and show how the behaviour of the Euler-Rabinowitsch polynomials and certain continued fraction expansions come into play in the complete determination...

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