Relations between Multi-Poly-Bernoulli numbers and Poly-Bernoulli   numbers of negative index

Hiroyuki Komaki

arXiv:1503.04933·math.NT·March 18, 2015

Relations between Multi-Poly-Bernoulli numbers and Poly-Bernoulli numbers of negative index

Hiroyuki Komaki

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TL;DR

This paper explores the mathematical relationships between Multi-Poly-Bernoulli numbers and negative index Poly-Bernoulli numbers, providing new identities and relations within this number theory domain.

Contribution

It introduces new identities and relations connecting Multi-Poly-Bernoulli numbers with negative index Poly-Bernoulli numbers, expanding understanding of their interconnections.

Findings

01

Established an identity for Multi-Poly-Bernoulli numbers of negative index.

02

Derived relations between Multi-Poly-Bernoulli numbers and negative index Poly-Bernoulli numbers.

Abstract

Poly-Bernoulli numbers $B_{n}^{(k)} \in Q$ \,( $n \geq 0$ ,\, $k \in Z$ ) are defined by Kaneko in 1997. Multi-Poly-Bernoulli numbers\, $B_{n}^{(k_{1}, k_{2}, \dots, k_{r})}$ , defined by using multiple polylogarithms, are generations of Kaneko's Poly-Bernoulli numbers\, $B_{n}^{(k)}$ . We researched relations between Multi-Poly-Bernoulli numbers and Poly-Bernoulli numbers of negative index in particular. In section 2, we introduce a identity for Multi-Poly-Bernoulli numbers of negative index which was proved by Kamano. In section 3, as main results, we introduce some relations between Multi-Poly-Bernoulli numbers and Poly-Bernoulli numbers of negative index in particular.

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Taxonomy

TopicsAdvanced Mathematical Identities · Advanced Combinatorial Mathematics · Analytic Number Theory Research