Approximate formulae for L(1,χ), II
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Publication:4811220
DOI10.4064/aa112-2-4zbMath1053.11073OpenAlexW1666650339MaRDI QIDQ4811220
Publication date: 18 August 2004
Published in: Acta Arithmetica (Search for Journal in Brave)
Full work available at URL: http://journals.impan.gov.pl/aa/Inf/112-2-4.html
Related Items (12)
On the use of explicit bounds on residues of Dedekind zeta functions taking into account the behavior of small primes ⋮ The class number one problem for the normal CM-fields of degree 32 ⋮ Explicit lower bounds on \(|L (1, \chi)|\) ⋮ Explicit estimates for Artin \(L\)-functions: Duke's short-sum theorem and Dedekind zeta residues ⋮ Class number one problem for normal CM-fields ⋮ An explicit upper bound for \(L(1,\chi)\) when \(\chi\) is quadratic ⋮ New bounds for the fundamental units and class numbers of real quadratic fields ⋮ Upper bounds on $L(1,\chi )$ taking into account a finite set of prime ideals ⋮ On large values of L(σ,χ) ⋮ Upper bounds on \(L(1,\chi)\) taking into account ramified prime ideals ⋮ Some explicit upper bounds for residues of zeta functions of number fields taking into account the behavior of the prime \(2\) ⋮ Upper bounds on residues of Dedekind zeta functions of non-normal totally real cubic fields
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