Results 71 to 80 of about 3,795 (162)
Tauberian conditions under which convergence follows from Abel summability
Applied Mathematics Letters, 2010 The authors prove that if \((u(n))\) is Abel summable to \(s\) and if \((u(n))\) is one-sided slowly oscillating, then \(u(n)\) converges to \(s\). The proof of the result is based on a corollary to Karamata's main theorem [\textit{J.\ Karamata}, Math.\ Z. 32, 319--320 (1930; JFM 56.0210.01)].
Totur, Umit, Canak, Ibrahim
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Testing homogeneity: the trouble with sparse functional data. [PDF]
J R Stat Soc Series B Stat Methodol, 2023 Zhu C, Wang JL.
europepmc +1 more source
One-sided Tauberian conditions for a general summability method
Mathematical and Computer Modelling, 2011 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Totur, Ümit, Dik, Mehmet
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An asymptotic variance of the self-intersections of random walks
, 2010 We present a Darboux-Wiener type lemma and apply it to obtain an exact asymptotic for the variance of the self-intersection of one and two-dimensional random walks.
Deligiannidis, George, Utev, Sergey
core
Revista IntegraciónIn this paper, we show necessary and sufficient conditions under which convergence of a triple sequence in Pringsheim’s sense follows from its weighted-Cesáro summability. These Tauberian conditions are one-sided or two sided if it is a sequence of real
Carlos Granados
doaj
On Tauberian conditions of type 𝑜 [PDF]
Bulletin of the American Mathematical Society, 1967 Meyer-König, Werner, Tietz, Hubert
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On Tauberian conditions for the Hölder integrability method
PositivityAbstract Let f be a real-valued continuous function on $$[0,\infty )$$ [ 0 , ∞ ) .
Okur, Muhammet Ali, Çanak, İbrahim
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STRUCTURE OF TAYLOR COEFFICIENTS BY EQUIVALENCE OF TAUBERIAN CONDITIONS
Demonstratio Mathematica, 2008 AbstractFrom the equivalent statement of a sequence (
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Valuing the Future and Discounting in Random Environments: A Review. [PDF]
Entropy (Basel), 2022 Masoliver J +5 more
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Asymptotic Analysis of Regular Sequences. [PDF]
Algorithmica, 2020 Heuberger C, Krenn D.
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