Class numbers and quadratic residues
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Publication:4085831
DOI10.1017/S0017089500002718zbMath0323.12006MaRDI QIDQ4085831
John B. Friedlander, Sarvadaman Chowla
Publication date: 1976
Published in: Glasgow Mathematical Journal (Search for Journal in Brave)
Related Items (20)
Class number one problem for real quadratic fields. (The conjecture of Gauss) ⋮ On S. Chowla's conjecture ⋮ The distribution of class numbers in a special family of real quadratic fields ⋮ Values of modular functions at real quadratics and conjectures of Kaneko ⋮ On prime valued polynomials and class numbers of real quadratic fields ⋮ Polynomial behavior of special values of partial zeta functions of real quadratic fields at \(s = 0\) ⋮ A NOTE ON CERTAIN REAL QUADRATIC FIELDS WITH CLASS NUMBER UP TO THREE ⋮ Unnamed Item ⋮ On a determination of real quadratic fields of class number one and related continued fraction period length less than 25 ⋮ Partial Dedekind Zeta Values and Class Numbers of R–D Type Real Quadratic Fields ⋮ Class number 2 problem for certain real quadratic fields of Richaud-Degert type ⋮ Quadratic irrationals with fixed period length in the continued fraction expansion ⋮ On the structure of order 4 class groups of \(\mathbb{Q}(\sqrt{n^2+1})\) ⋮ Lower Bounds for Class Numbers of Real Quadratic and Biquadratic Fields ⋮ On the divisor function and class numbers of real quadratic fields. II ⋮ A Conjecture of S. Chowla Via the Generalized Riemann Hypothesis ⋮ Proof of class number formulae by machine ⋮ Some results connected with the class number problem in real quadratic fields ⋮ Necessary and Sufficient Conditions for the Class Number of a Real Quadratic Field to be One, and a Conjecture of S. Chowla ⋮ Lower bound for class numbers of certain real quadratic fields
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