Quantitative irrationality for sums of reciprocals of Fibonacci and Lucas numbers
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Publication:850532
DOI10.1007/s11139-006-6511-4zbMath1104.11040OpenAlexW2085475616MaRDI QIDQ850532
Marc Prevost, Tapani Matala-aho
Publication date: 3 November 2006
Published in: The Ramanujan Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11139-006-6511-4
Measures of irrationality and of transcendence (11J82) Fibonacci and Lucas numbers and polynomials and generalizations (11B39)
Related Items (5)
Linear independence of certain sums of reciprocals of the Lucas numbers ⋮ Linear independence results for sums of reciprocals of Fibonacci and Lucas numbers ⋮ On irrationality measures of \(\sum^{\infty}_{l=0}d^{l} / \prod^l_{j=1}(1+d^jr+d^{2j}s)\) ⋮ New irrationality measures for 𝑞-logarithms ⋮ Irrationality proof of certain Lambert series using little \(q\)-Jacobi polynomials
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- LCM of sequences of polynomials
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- On Diophantine approximations of the solutions of q-functional equations
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