Transformation of generalized multiple Riemann zeta type sums with repeated arguments

Kód výsledku v IS VaVaI

<a href="https://www.isvavai.cz/riv?ss=detail&h=RIV%2F61989100%3A27510%2F17%3A10237600" target="_blank" >RIV/61989100:27510/17:10237600 - isvavai.cz</a>

Výsledek na webu

<a href="http://dx.doi.org/10.1016/j.jmaa.2016.12.023" target="_blank" >http://dx.doi.org/10.1016/j.jmaa.2016.12.023</a>

DOI - Digital Object Identifier

<a href="http://dx.doi.org/10.1016/j.jmaa.2016.12.023" target="_blank" >10.1016/j.jmaa.2016.12.023</a>

Jazyk výsledku

angličtina

Název v původním jazyce

Transformation of generalized multiple Riemann zeta type sums with repeated arguments

Popis výsledku v původním jazyce

The aim of this paper is the study of a transformation dealing with the general K-fold infinite series of the form Sigma(n1 &gt;=...&gt;= nK &gt;= 1) Pi(K)(j=1) a(nj), especially those, where a(n) = R(n) is a rational function satisfying certain simple conditions. These sums represent the direct generalization of the well-known multiple Riemann zeta -star function with repeated arguments zeta*({s}(K)) when a(n) = 1/n(s). Our result reduces Sigma Pi a(nj) to a special kind of one-fold infinite series. We apply the main theorem to the rational function R(n) = 1/((n + a)(s) + b(s)) in case of which the resulting K-fold sum is called the generalized multiple Hurwitz zeta -star function zeta*(a, b; {s}(K)). We construct an effective algorithm enabling the complete evaluation of zeta*(a, b; {2s}(K)) with a is an element of {0, -1/2}, b is an element of R {0}, (K, s) is an element of N-2, by means of a differential operator and present a simple &apos;Mathematica&apos; code that allows their symbolic calculation. We also provide a new transformation of the ordinary multiple Riemann zeta-star values zeta*({2s}(K)) and zeta*({3}(K)) corresponding to a = b = 0.

Název v anglickém jazyce

Transformation of generalized multiple Riemann zeta type sums with repeated arguments

Popis výsledku anglicky

The aim of this paper is the study of a transformation dealing with the general K-fold infinite series of the form Sigma(n1 &gt;=...&gt;= nK &gt;= 1) Pi(K)(j=1) a(nj), especially those, where a(n) = R(n) is a rational function satisfying certain simple conditions. These sums represent the direct generalization of the well-known multiple Riemann zeta -star function with repeated arguments zeta*({s}(K)) when a(n) = 1/n(s). Our result reduces Sigma Pi a(nj) to a special kind of one-fold infinite series. We apply the main theorem to the rational function R(n) = 1/((n + a)(s) + b(s)) in case of which the resulting K-fold sum is called the generalized multiple Hurwitz zeta -star function zeta*(a, b; {s}(K)). We construct an effective algorithm enabling the complete evaluation of zeta*(a, b; {2s}(K)) with a is an element of {0, -1/2}, b is an element of R {0}, (K, s) is an element of N-2, by means of a differential operator and present a simple &apos;Mathematica&apos; code that allows their symbolic calculation. We also provide a new transformation of the ordinary multiple Riemann zeta-star values zeta*({2s}(K)) and zeta*({3}(K)) corresponding to a = b = 0.

Druh

J_imp - Článek v periodiku v databázi Web of Science

CEP obor

—

OECD FORD obor

10101 - Pure mathematics

Projekt

—

Návaznosti

I - Institucionalni podpora na dlouhodoby koncepcni rozvoj vyzkumne organizace

Rok uplatnění

2017

Kód důvěrnosti údajů

S - Úplné a pravdivé údaje o projektu nepodléhají ochraně podle zvláštních právních předpisů

Název periodika

Journal of Mathematical Analysis and Applications

ISSN

0022-247X

e-ISSN

—

Svazek periodika

449

Číslo periodika v rámci svazku

1

Stát vydavatele periodika

US - Spojené státy americké

Počet stran výsledku

24

Strana od-do

490-513

Kód UT WoS článku

000393148100025

EID výsledku v databázi Scopus

2-s2.0-85008208871