By employing the coefficient extraction method from hypergeometric series, we shall establish numerous closed form evaluations for infinite series containing central binomial coefficients and harmonic numbers, including several conjectured ones made by Z.-W. Sun
AbstractIn terms of the hypergeometric method, we establish ten general π-formulas with free paramet...
AbstractThe main object of the present paper is to derive various classes of double-series identitie...
AbstractThe authors investigate several families of double-series identities as well as their (known...
In terms of the operator method, we prove two conjectural series for $\pi$ of Sun involving harmonic...
In this paper, we define a q-extension of the new generalized hypergeometric function given by Saxen...
In this paper, we define a q-extension of the new generalized hypergeometric function given by Saxen...
In this paper, we define a q-extension of the new generalized hypergeometric function given by Saxen...
AbstractDixon’s classical summation theorem on F23(1)-series is reformulated as an equation of forma...
AbstractRecently, R. Tauraso established finite p-analogues of Apéryʼs famous series for ζ(2) and ζ(...
In this paper, we will prove Zhi-Wei Sun's four conjectural identities on Ap\'{e}ry-like sums involv...
We consider some finite binomial sums involving the derivatives of the binomial coefficient and deve...
summary:We give higher-power generalizations of the classical Lerch formula for the gamma function
With the help of the partial derivative operator and several summation formulas for hypergeometric s...
summary:We give higher-power generalizations of the classical Lerch formula for the gamma function
Contains a correction with respect to the printed versionWe provide sharp estimates for the number o...
AbstractIn terms of the hypergeometric method, we establish ten general π-formulas with free paramet...
AbstractThe main object of the present paper is to derive various classes of double-series identitie...
AbstractThe authors investigate several families of double-series identities as well as their (known...
In terms of the operator method, we prove two conjectural series for $\pi$ of Sun involving harmonic...
In this paper, we define a q-extension of the new generalized hypergeometric function given by Saxen...
In this paper, we define a q-extension of the new generalized hypergeometric function given by Saxen...
In this paper, we define a q-extension of the new generalized hypergeometric function given by Saxen...
AbstractDixon’s classical summation theorem on F23(1)-series is reformulated as an equation of forma...
AbstractRecently, R. Tauraso established finite p-analogues of Apéryʼs famous series for ζ(2) and ζ(...
In this paper, we will prove Zhi-Wei Sun's four conjectural identities on Ap\'{e}ry-like sums involv...
We consider some finite binomial sums involving the derivatives of the binomial coefficient and deve...
summary:We give higher-power generalizations of the classical Lerch formula for the gamma function
With the help of the partial derivative operator and several summation formulas for hypergeometric s...
summary:We give higher-power generalizations of the classical Lerch formula for the gamma function
Contains a correction with respect to the printed versionWe provide sharp estimates for the number o...
AbstractIn terms of the hypergeometric method, we establish ten general π-formulas with free paramet...
AbstractThe main object of the present paper is to derive various classes of double-series identitie...
AbstractThe authors investigate several families of double-series identities as well as their (known...
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