Skip to the main content

Original scientific paper

https://doi.org/10.3336/gm.49.2.09

Combinatorial convolution sums derived from divisor functions and Faulhaber sums

Bumkyu Cho ; Department of Mathematics, Dongguk University-Seoul, 26 Pil-dong 3-ga Jung-gu Seoul, South Korea
Daeyeoul Kim ; National Institute for Mathematical Science , Yuseong-daero 1689-gil Daejeon 305-811, South Korea
Ho Park ; Department of Mathematics, Dongguk University-Seoul,, 26 Pil-dong 3-ga Jung-gu Seoul, South Korea


Full text: english pdf 137 Kb

page 351-367

downloads: 195

cite


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

Divisor functions; convolution sums; Faulhaber's sum

Hrčak ID:

130889

URI

https://hrcak.srce.hr/130889

Publication date:

18.12.2014.

Visits: 794 *