Simultaneous generation for zeta values by the Markov-WZ method

A symbolic approach to multiple zeta values at negative integers

Jiu, Lin
Moll, Victor H.
Vignat, Christophe

January 2018

International audienceA symbolic computation technique is used to derive closed-form expressions for...

Computation and theory of extended Mordell-Tornheim-Witten sums

David H. Bailey
Jonathan M. Borwein
Richard
E. Crandall

January 2013

Abstract. We consider some fundamental generalized Mordell–Tornheim–Witten (MTW) zeta-function value...

SYMMETRY PHENOMENOMS IN LINEAR FORMS IN MULTIPLE ZETA VALUES

T. Rivoal
The Following Text
S. Fischler

January 2015

to the talk I gave at Turun Yliopisto in may 2007 during the ANT conference. I warmly thank the orga...

Simultaneous generation for zeta values by the Markov-WZ method

Khodabakhsh Hessami Pilehrood
Tatiana Hessami Pilehrood

August 2008

By application of the Markov-WZ method, we prove a more general form of a bivariate generating fun...

A q-analogue of the Bailey–Borwein–Bradley identity

Hessami Pilehrood, Kh.
Hessami Pilehrood, T.

June 2011

AbstractWe establish a q-analogue of the Bailey–Borwein–Bradley identity generating accelerated seri...

Combinatorial aspects of multiple zeta values

Borwein, Jonathan M.
Bradley, David M.
Broadhurst, David J.
Lisoněk, Petr

January 1998

Multiple zeta values (MZVs, also called Euler sums or multiple harmonic series) are nested generaliz...

Infinite families of accelerated series for some classical constants by the Markov-WZ Method

Mohamud Mohammed

December 2005

In this article we show the Markov-WZ Method in action as it finds rapidly converging series repre...

Infinite families of accelerated series for some classical constants by the Markov-WZ Method

Mohammed, Mohamud

January 2005

In this article we show the Markov-WZ Method in action as it finds rapidly converging series represe...

Combinatorial Aspects of Multiple Zeta Values

Jonathan M. Borwein
David M. Bradley
David J. Broadhurst
Petr Lison Ek

January 1998

Multiple zeta values (MZVs, also called Euler sums or multiple harmonic series) are nested generaliz...

A GENERATING FUNCTION FOR SUMS OF MULTIPLE ZETA VALUES AND ITS APPLICATIONS

Takashi Aoki
Yasuhiro Kombu
Yasuo Ohno
Communicated Jonathan M. Borwein

April 2008

Abstract. A generating function for specified sums of multiple zeta values is defined and a differen...

Experimental Determination of Apery-Like Identities for Zeta(2n+2)

Bailey, David H.
Borwein, Jonathan M.
Bradley, David M.

May 2005

We document the discovery of two generating functions for zeta(2n+2), analogous to earlier work for...

Generalized Lambert series and arithmetic nature of odd zeta values

Dixit, Atul
Maji, Bibekananda

February 2019

It is pointed out that the generalized Lambert series��studied by Kanemitsu, Tanigawa and Yoshimoto ...

Algorithms for Some Euler-Type Identities for Multiple Zeta Values

Shifeng Ding
Weijun Liu

January 2013

Multiple zeta values are the numbers defined by the convergent series ζ(s1,s2,…,sk)=∑n1>n2>⋯>nk>0(1/...

Empirically determined Apéry-like formulae for ζ(4n+3)

Borwein, Jonathan
Bradley, David

January 1997

Some rapidly convergent formulae for special values of the Riemann zeta function are given. We obtai...

AN EFFICIENT ALGORITHM FOR ACCELERATING THE CONVERGENCE OF OSCILLATORY SERIES, USEFUL FOR COMPUTING THE POLYLOGARITHM AND HURWITZ ZETA FUNCTIONS

Linas Vepštas

December 2014

ABSTRACT. This paper sketches a technique for improving the rate of convergence of a general oscilla...

A symbolic approach to multiple zeta values at negative integers

Jiu, Lin
Moll, Victor H.
Vignat, Christophe

January 2018

International audienceA symbolic computation technique is used to derive closed-form expressions for...

Computation and theory of extended Mordell-Tornheim-Witten sums

David H. Bailey
Jonathan M. Borwein
Richard
E. Crandall

January 2013

Abstract. We consider some fundamental generalized Mordell–Tornheim–Witten (MTW) zeta-function value...

SYMMETRY PHENOMENOMS IN LINEAR FORMS IN MULTIPLE ZETA VALUES

T. Rivoal
The Following Text
S. Fischler

January 2015

to the talk I gave at Turun Yliopisto in may 2007 during the ANT conference. I warmly thank the orga...

Simultaneous generation for zeta values by the Markov-WZ method

Khodabakhsh Hessami Pilehrood
Tatiana Hessami Pilehrood

August 2008

By application of the Markov-WZ method, we prove a more general form of a bivariate generating fun...

A q-analogue of the Bailey–Borwein–Bradley identity

Hessami Pilehrood, Kh.
Hessami Pilehrood, T.

June 2011

AbstractWe establish a q-analogue of the Bailey–Borwein–Bradley identity generating accelerated seri...

Combinatorial aspects of multiple zeta values

Borwein, Jonathan M.
Bradley, David M.
Broadhurst, David J.
Lisoněk, Petr

January 1998

Multiple zeta values (MZVs, also called Euler sums or multiple harmonic series) are nested generaliz...

Infinite families of accelerated series for some classical constants by the Markov-WZ Method

Mohamud Mohammed

December 2005

In this article we show the Markov-WZ Method in action as it finds rapidly converging series repre...

Infinite families of accelerated series for some classical constants by the Markov-WZ Method

Mohammed, Mohamud

January 2005

In this article we show the Markov-WZ Method in action as it finds rapidly converging series represe...

Combinatorial Aspects of Multiple Zeta Values

Jonathan M. Borwein
David M. Bradley
David J. Broadhurst
Petr Lison Ek

January 1998

Multiple zeta values (MZVs, also called Euler sums or multiple harmonic series) are nested generaliz...

A GENERATING FUNCTION FOR SUMS OF MULTIPLE ZETA VALUES AND ITS APPLICATIONS

Takashi Aoki
Yasuhiro Kombu
Yasuo Ohno
Communicated Jonathan M. Borwein

April 2008

Abstract. A generating function for specified sums of multiple zeta values is defined and a differen...

Experimental Determination of Apery-Like Identities for Zeta(2n+2)

Bailey, David H.
Borwein, Jonathan M.
Bradley, David M.

May 2005

We document the discovery of two generating functions for zeta(2n+2), analogous to earlier work for...

Generalized Lambert series and arithmetic nature of odd zeta values

Dixit, Atul
Maji, Bibekananda

February 2019

It is pointed out that the generalized Lambert series��studied by Kanemitsu, Tanigawa and Yoshimoto ...

Algorithms for Some Euler-Type Identities for Multiple Zeta Values

Shifeng Ding
Weijun Liu

January 2013

Multiple zeta values are the numbers defined by the convergent series ζ(s1,s2,…,sk)=∑n1>n2>⋯>nk>0(1/...

Empirically determined Apéry-like formulae for ζ(4n+3)

Borwein, Jonathan
Bradley, David

January 1997

Some rapidly convergent formulae for special values of the Riemann zeta function are given. We obtai...

AN EFFICIENT ALGORITHM FOR ACCELERATING THE CONVERGENCE OF OSCILLATORY SERIES, USEFUL FOR COMPUTING THE POLYLOGARITHM AND HURWITZ ZETA FUNCTIONS

Linas Vepštas

December 2014

ABSTRACT. This paper sketches a technique for improving the rate of convergence of a general oscilla...

A symbolic approach to multiple zeta values at negative integers

Jiu, Lin
Moll, Victor H.
Vignat, Christophe

January 2018

International audienceA symbolic computation technique is used to derive closed-form expressions for...

Computation and theory of extended Mordell-Tornheim-Witten sums

David H. Bailey
Jonathan M. Borwein
Richard
E. Crandall

January 2013

Abstract. We consider some fundamental generalized Mordell–Tornheim–Witten (MTW) zeta-function value...

SYMMETRY PHENOMENOMS IN LINEAR FORMS IN MULTIPLE ZETA VALUES

T. Rivoal
The Following Text
S. Fischler

January 2015

to the talk I gave at Turun Yliopisto in may 2007 during the ANT conference. I warmly thank the orga...

Simultaneous generation for zeta values by the Markov-WZ method

Abstract

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Simultaneous generation for zeta values by the Markov-WZ method

Abstract

Extracted data

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