Taylor's series expansions for real powers of functions containing squares of inverse (hyperbolic) cosine functions, explicit formulas for special partial Bell polynomials, and series representations for powers of circular constant

Lerch's $\Phi$ and the Polylogarithm at the Negative Integers

Sousa, Jose Risomar

July 2022

At the negative integers, there is a simple relation between the Lerch $\Phi$ function and the polyl...

Congruences arising from Apéry-type series for zeta values

Hessami Pilehrood, Kh.
Hessami Pilehrood, T.

October 2012

AbstractRecently, R. Tauraso established finite p-analogues of Apéryʼs famous series for ζ(2) and ζ(...

On two conjectural series for $\pi$ and their $q$-analogues

Wei, Chuanan

November 2022

In terms of the operator method, we prove two conjectural series for $\pi$ of Sun involving harmonic...

Approximation by Power Series of Functions

Liptaj, Andrej

November 2022

Derivative-matching approximations are constructed as power series built from functions. The method ...

Diagonal recurrence relations for the Stirling numbers of the first kind

Qi, Feng

July 2016

In the paper, the author presents diagonal recurrence relations for the Stirling numbers of the firs...

Two closed forms for the Bernoulli polynomials

Qi, Feng
Chapman, Robin

February 2016

In the paper, the authors find two closed forms involving the Stirling numbers of the second kind an...

Disjoint Convolution Sums of Stirling Numbers

Chu, Wenchang

January 2021

By means of the connection coefficient approach, disjoint convolution sums are evaluated in closed f...

Curious extensions of Ramanujan's ψ11 summation formula

Guo, Victor J.W.
Schlosser, Michael J.

October 2007

AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...

A new asymptotic series for the Gamma function

Shi, Xiquan
Liu, Fengshan
Hu, Minghan

October 2006

AbstractThe famous Stirling's formula says that Γ(s+1)=2πs(s/e)seγ(s)=2π(s/e)seθ(s)/12s. In this pap...

Some double-series identities and associated generating-function relationships

Chen, Kung-Yu
Liu, Shuoh-Jung
Srivastava, H.M.

September 2006

AbstractThe main object of the present work is to investigate several families of double-series iden...

Infinite series about harmonic numbers inspired by Ramanujan–like formulae

Chunli Li
Wenchang Chu

June 2023

By employing the coefficient extraction method from hypergeometric series, we shall establish numero...

Dixon’s F23(1)-series and identities involving harmonic numbers and the Riemann zeta function

Chen, Xiaojing
Chu, Wenchang

January 2010

AbstractDixon’s classical summation theorem on F23(1)-series is reformulated as an equation of forma...

On p-extended Mathieu series

Tibor K. Pogány
Rakesh K. Parmar

January 2018

Motivated by several generalizations of the well–known Mathieu series, the main object of this paper...

On power series of products of special functions

Brychkov, Yu.A.

August 2011

AbstractSome methods are considered for obtaining power series of products and powers of elementary ...

Well-poised generation of Apéry-like recursions

Zudilin, Wadim

June 2005

AbstractThe idea to use classical hypergeometric series and, in particular, well-poised hypergeometr...

Lerch's $\Phi$ and the Polylogarithm at the Negative Integers

Sousa, Jose Risomar

July 2022

At the negative integers, there is a simple relation between the Lerch $\Phi$ function and the polyl...

Congruences arising from Apéry-type series for zeta values

Hessami Pilehrood, Kh.
Hessami Pilehrood, T.

October 2012

AbstractRecently, R. Tauraso established finite p-analogues of Apéryʼs famous series for ζ(2) and ζ(...

On two conjectural series for $\pi$ and their $q$-analogues

Wei, Chuanan

November 2022

In terms of the operator method, we prove two conjectural series for $\pi$ of Sun involving harmonic...

Approximation by Power Series of Functions

Liptaj, Andrej

November 2022

Derivative-matching approximations are constructed as power series built from functions. The method ...

Diagonal recurrence relations for the Stirling numbers of the first kind

Qi, Feng

July 2016

In the paper, the author presents diagonal recurrence relations for the Stirling numbers of the firs...

Two closed forms for the Bernoulli polynomials

Qi, Feng
Chapman, Robin

February 2016

In the paper, the authors find two closed forms involving the Stirling numbers of the second kind an...

Disjoint Convolution Sums of Stirling Numbers

Chu, Wenchang

January 2021

By means of the connection coefficient approach, disjoint convolution sums are evaluated in closed f...

Curious extensions of Ramanujan's ψ11 summation formula

Guo, Victor J.W.
Schlosser, Michael J.

October 2007

AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...

A new asymptotic series for the Gamma function

Shi, Xiquan
Liu, Fengshan
Hu, Minghan

October 2006

AbstractThe famous Stirling's formula says that Γ(s+1)=2πs(s/e)seγ(s)=2π(s/e)seθ(s)/12s. In this pap...

Some double-series identities and associated generating-function relationships

Chen, Kung-Yu
Liu, Shuoh-Jung
Srivastava, H.M.

September 2006

AbstractThe main object of the present work is to investigate several families of double-series iden...

Infinite series about harmonic numbers inspired by Ramanujan–like formulae

Chunli Li
Wenchang Chu

June 2023

By employing the coefficient extraction method from hypergeometric series, we shall establish numero...

Dixon’s F23(1)-series and identities involving harmonic numbers and the Riemann zeta function

Chen, Xiaojing
Chu, Wenchang

January 2010

AbstractDixon’s classical summation theorem on F23(1)-series is reformulated as an equation of forma...

On p-extended Mathieu series

Tibor K. Pogány
Rakesh K. Parmar

January 2018

Motivated by several generalizations of the well–known Mathieu series, the main object of this paper...

On power series of products of special functions

Brychkov, Yu.A.

August 2011

AbstractSome methods are considered for obtaining power series of products and powers of elementary ...

Well-poised generation of Apéry-like recursions

Zudilin, Wadim

June 2005

AbstractThe idea to use classical hypergeometric series and, in particular, well-poised hypergeometr...

Lerch's $\Phi$ and the Polylogarithm at the Negative Integers

Sousa, Jose Risomar

July 2022

At the negative integers, there is a simple relation between the Lerch $\Phi$ function and the polyl...

Congruences arising from Apéry-type series for zeta values

Hessami Pilehrood, Kh.
Hessami Pilehrood, T.

October 2012

AbstractRecently, R. Tauraso established finite p-analogues of Apéryʼs famous series for ζ(2) and ζ(...

On two conjectural series for $\pi$ and their $q$-analogues

Wei, Chuanan

November 2022

In terms of the operator method, we prove two conjectural series for $\pi$ of Sun involving harmonic...

Taylor's series expansions for real powers of functions containing squares of inverse (hyperbolic) cosine functions, explicit formulas for special partial Bell polynomials, and series representations for powers of circular constant

Abstract

Extracted data

Taylor's series expansions for real powers of functions containing squares of inverse (hyperbolic) cosine functions, explicit formulas for special partial Bell polynomials, and series representations for powers of circular constant

Abstract

Extracted data

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