Combinatorial convolution sums derived from divisor functions and Faulhaber sums

Bumkyu Cho; Daeyeoul Kim; Ho Park

doi:10.3336/gm.49.2.09

Combinatorial convolution sums derived from divisor functions and Faulhaber sums

Bumkyu Cho^*
, Daeyeoul Kim
, Ho Park

^*Corresponding author for this work

Department of Mathematics

Dongguk University
National Institute for Mathematical Sciences

Research output: Contribution to journal › Journal article › peer-review

1 Scopus citations

Abstract

It is known that certain convolution sums using Liouville identity can be expressed as a combination of divisor functions and Bernoulli numbers. In this article we find seven combinatorial convolution sums derived from divisor functions and Bernoulli numbers.

Original language	English
Pages (from-to)	351-367
Number of pages	17
Journal	Glasnik Matematicki
Volume	49
Issue number	2
DOIs	https://doi.org/10.3336/gm.49.2.09
State	Published - 2014

Keywords

Convolution sums
Divisor functions
Faulhaber’s sum

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10.3336/gm.49.2.09

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title = "Combinatorial convolution sums derived from divisor functions and Faulhaber sums",

abstract = "It is known that certain convolution sums using Liouville identity can be expressed as a combination of divisor functions and Bernoulli numbers. In this article we find seven combinatorial convolution sums derived from divisor functions and Bernoulli numbers.",

keywords = "Convolution sums, Divisor functions, Faulhaber{\textquoteright}s sum",

author = "Bumkyu Cho and Daeyeoul Kim and Ho Park",

year = "2014",

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language = "English",

volume = "49",

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T1 - Combinatorial convolution sums derived from divisor functions and Faulhaber sums

AU - Cho, Bumkyu

AU - Kim, Daeyeoul

AU - Park, Ho

PY - 2014

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N2 - It is known that certain convolution sums using Liouville identity can be expressed as a combination of divisor functions and Bernoulli numbers. In this article we find seven combinatorial convolution sums derived from divisor functions and Bernoulli numbers.

AB - It is known that certain convolution sums using Liouville identity can be expressed as a combination of divisor functions and Bernoulli numbers. In this article we find seven combinatorial convolution sums derived from divisor functions and Bernoulli numbers.

KW - Convolution sums

KW - Divisor functions

KW - Faulhaber’s sum

UR - https://www.scopus.com/pages/publications/84919389794

U2 - 10.3336/gm.49.2.09

DO - 10.3336/gm.49.2.09

M3 - Journal article

AN - SCOPUS:84919389794

SN - 0017-095X

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SP - 351

EP - 367

JO - Glasnik Matematicki

JF - Glasnik Matematicki

IS - 2

ER -

Combinatorial convolution sums derived from divisor functions and Faulhaber sums

Abstract

Keywords

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