Obtaining Concise Formulae on Bernoulli Polynomials-Numbers and Sums of Powers-Faulhaber Problems

Si, Do Tan (2023) Obtaining Concise Formulae on Bernoulli Polynomials-Numbers and Sums of Powers-Faulhaber Problems. In: Research Highlights in Mathematics and Computer Science Vol. 6. B P International, pp. 13-39. ISBN 978-81-19102-02-0

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Abstract

Utilizing the translation operator exp (a z) to represent Bernoulli polynomials Bm(z) and power sums Sm(z,n) as polynomials of Appell-type , we obtain concisely almost all their known properties as so as many new ones, especially very simple symbolic formulae for calculating Bernoulli numbers and polynomials, power sums of entire and complex numbers. Then by the change of arguments from z into Z = z(z-1) and n into which is the 1st order power sum we obtain the Faulhaber formula for powers sums in term of polynomials in having coefficients depending on Z. Practically we give tables for calculating in easiest possible manners Tables of Bernoulli numbers, Bernoulli polynomials, sums of powers of complex numbers are given.

Item Type: Book Section
Subjects: Eprints AP open Archive > Mathematical Science
Depositing User: Unnamed user with email admin@eprints.apopenarchive.com
Date Deposited: 02 Oct 2023 05:41
Last Modified: 02 Oct 2023 05:41
URI: http://asian.go4sending.com/id/eprint/1126

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