Bernoulli numbers, convolution sums and congruences of coefficients for certain generating functions

被引：0

作者：

Daeyeoul Kim

Aeran Kim

Ayyadurai Sankaranarayanan

机构：

[1] National Institute for Mathematical Sciences,Department of Mathematics and Institute of Pure and Applied Mathematics

[2] Chonbuk National University,Permanent address: School of Mathematics

[3] Current address: National Institute for Mathematical Sciences,undefined

[4] Tata Institute of Fundamental Research,undefined

来源：

Journal of Inequalities and Applications | / 2013卷

关键词：

Bernoulli numbers; generating functions; divisor functions; convolution sums;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

In this paper, we study the convolution sums involving restricted divisor functions, their generalizations, their relations to Bernoulli numbers, and some interesting applications.

引用

共 20 条

[11]

Kim M-S(2012), II Honam Math. J 34 519-531

[12]

Lee JH(2013)Evaluation of the convolution sums Bull. Korean Math. Soc 50 241-261

[13]

Kim A(2005) and Yokohama Math. J 52 39-57

[14]

Kim D(undefined)Elliptic analogue of the Hardy sums related to elliptic Bernoulli functions undefined undefined undefined-undefined

[15]

Seo G(undefined)On sums of the extended undefined undefined undefined-undefined

[16]

Kim D(undefined)-Euler numbers undefined undefined undefined-undefined

[17]

Kim A(undefined)Convolution sum undefined undefined undefined-undefined

[18]

Park H(undefined)Congruences of the Weierstrass undefined undefined undefined-undefined

[19]

Cheng N(undefined) and undefined undefined undefined-undefined

[20]

Williams KS(undefined) ( undefined undefined undefined-undefined

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