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Irrationality of values of the Riemann zeta function - MaRDI portal

Irrationality of values of the Riemann zeta function

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Publication:4709974

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DOI10.1070/IM2002v066n03ABEH000387zbMath1114.11305arXivmath/0104249MaRDI QIDQ4709974

Wadim Zudilin

Publication date: 7 October 2003

Published in: Izvestiya: Mathematics (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/math/0104249

Mathematics Subject Classification ID

(zeta (s)) and (L(s, chi)) (11M06) Irrationality; linear independence over a field (11J72)

Related Items (26)

On a method for constructing a family of approximations of zeta constants by rational fractions ⋮ Linear independence of values of \(G\)-functions ⋮ Irrationality of the sums of zeta values ⋮ Quantitative generalizations of Nesterenkos's linear independence criterion ⋮ A note on odd zeta values ⋮ Hermite-Padé rational approximation to irrational numbers ⋮ Linear Mahler measures and double \(L\)-values of modular forms ⋮ Riemann \(\mathfrak P\)-scheme, monodromy and Diophantine approximations ⋮ Many odd zeta values are irrational ⋮ A note on the number of irrational odd zeta values ⋮ Distribution of irrational zeta values ⋮ Representations of \(\zeta (2n + 1)\) and related numbers in the form of definite integrals and rapidly convergent series ⋮ Diophantine approximation ⋮ On the Zudilin-Rivoal theorem ⋮ Mellin transforms for multiple Jacobi-Piñeiro polynomials and a \(q\)-analogue ⋮ On theorems of Gelfond and Selberg concerning integral-valued entire functions ⋮ A refinement of Nesterenko's linear independence criterion with applications to zeta values ⋮ Integral identities and constructions of approximations to zeta-values ⋮ Well-poised hypergeometric series for Diophantine problems of zeta values ⋮ Arithmetic of linear forms involving odd zeta values ⋮ Many values of the Riemann zeta function at odd integers are irrational ⋮ Irrationality of \(\zeta _{q}(1)\) and \(\zeta _{q}(2)\) ⋮ Two hypergeometric tales and a new irrationality measure of \(\zeta (2)\) ⋮ On an evaluation method for zeta constants based on a number theoretic approach ⋮ Life and Mathematics of Alfred Jacobus van der Poorten (1942–2010) ⋮ HYPERGEOMETRY INSPIRED BY IRRATIONALITY QUESTIONS

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