A Computational Technique for Evaluating L(1, χ) and the Class Number of a Real Quadratic Field
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Publication:4113909
DOI10.2307/2005409zbMath0345.12004OpenAlexW4229610273MaRDI QIDQ4113909
Publication date: 1976
Published in: Mathematics of Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/2005409
Quadratic extensions (11R11) Zeta functions and (L)-functions of number fields (11R42) Iwasawa theory (11R23) Software, source code, etc. for problems pertaining to field theory (12-04)
Related Items (11)
On the use of explicit bounds on residues of Dedekind zeta functions taking into account the behavior of small primes ⋮ Zeta functions and periodic orbit theory: A review ⋮ Improving the Speed of Calculating the Regulator of Certain Pure Cubic Fields ⋮ Numerical verification of Littlewood's bounds for \(|L(1,\chi)|\) ⋮ Numerical estimates on the Landau-Siegel zero and other related quantities ⋮ Relative norm of the fundamental unit of certain biquadratic fields and parity of the lengths of cycles of reduced ideals ⋮ Computation of Real Quadratic Fields with Class Number One ⋮ On the Infrastructure of the Principal Ideal Class of an Algebraic Number Field of Unit Rank One ⋮ Efficient computation of root numbers and class numbers of parametrized families of real abelian number fields ⋮ On the Computation of the Class Number of an Algebraic Number Field ⋮ Computation of class numbers of quadratic number fields
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