2015 Help me understand this report
Quadratic alternating harmonic number sums
Abstract: We develop new closed form representations of sums of quadratic alternating harmonic numbers and reciprocal binomial coefficients.
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Cited by 71 publications
(41 citation statements)
References 22 publications
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“…It is possible to represent the alternating harmonic number sums (14), (15) and (16) in terms of an integral, this is developed in the next theorem.…”
Section: Lemma 13 For R ∈ N We Have the Identitymentioning
confidence: 99%
“…It is possible to represent the alternating harmonic number sums (14), (15) and (16) in terms of an integral, this is developed in the next theorem.…”
Section: Lemma 13 For R ∈ N We Have the Identitymentioning
confidence: 99%
“…[3,5,17,21]). Sofo and Hassani [19] derived further formulae by logarithmic integrals. Recently, Abel's lemma on summation by parts has been modified by Chu [10] to derive several infinite series identities involving the classical harmonic numbers and their variants.…”
Section: Introductionmentioning
confidence: 99%
“…For instance, in [2], Sofo gave the following identity: 4) where ζ (p) stands for the classical Riemann zeta function defined by [3] ζ (p) :…”
Section: Introductionmentioning
confidence: 99%
“…There are many works investigating sums of both harmonic numbers and binomial coefficients (see, for example, [1,2,[4][5][6] and the references therein). which is just the classical Euler sums S m,p defined in [7], where m := (m 1 , m 2 , .…”
Section: Introductionmentioning
confidence: 99%
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