A numerical study of Weber's real class number calculation
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Publication:2626004
DOI10.1007/BF01386236zbMath0117.27501OpenAlexW22038847MaRDI QIDQ2626004
Publication date: 1960
Published in: Numerische Mathematik (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/131469
Related Items (13)
WEBER'S CLASS NUMBER PROBLEM IN THE CYCLOTOMIC ℤ2-EXTENSION OF ℚ, III ⋮ Mahler measure and Weber's class number problem in the cyclotomic \(\mathbb Z_p\)-extension of \(\mathbb Q\) for odd prime number \(p\) ⋮ Weber's class number problem in the cyclotomic \(\mathbb Z_2\)-extension of \(\mathbb Q\). II. ⋮ Height and Weber's class number problem ⋮ Security analysis of cryptosystems using short generators over ideal lattices ⋮ Class numbers in cyclotomic \(\mathbb{Z}_p\)-extensions ⋮ On the norm-Euclideanity of \(\mathbb Q\left(\sqrt{2+\sqrt{2+\sqrt 2}}\right)\) and \(\mathbb Q\left(\sqrt{2+\sqrt 2}\right)\) ⋮ Some computational aspects of, and the use of computers in, algebraic number theory ⋮ A class number calculation of the \(5^{\mathrm{th}}\) layer of the cyclotomic \(\mathbb{Z}_2\)-extension of \(\mathbb{Q}(\sqrt{5})\) ⋮ On the Class Numbers in the Cyclotomic Z29- and Z31-Extensions of the Field of Rationals ⋮ Weber’s Class Number One Problem ⋮ The ideal class group of the basic \(\mathbb Z_p\)-extension over an imaginary quadratic field ⋮ Triviality of the ℓ-class groups in -extensions of for split primes p ≡ 1 modulo 4
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