Identities and approximation formulas for Faulhaber's formula revealing
in applications of moment generating function, distribution, and
arithmetic functions
- YILMAZ SIMSEK,
- Buket Simsek,
- Elif Şükrüoğlu
Abstract
The aim of this paper is to derive many novel formulas involving the sum
of powers of consecutive integers, the Bernoulli polynomials, the
Stirling numbers and moments arise from conditional probability, moment
generating functions and arithmetic functions by using the methods and
techniques, which are used in discrete distributions in statistics such
as uniform distribution, moment generating functions, and other
probability distributions. Moreover, relations among the generalized
Euler totient function, finite distributions containing special numbers
and polynomials, discrete probability formula, and other special
function are given. By using the Riemann zeta function and the
Liouville's function, we derive a novel moment formula probability
distribution on the set positive integers. Finally, by using
approximation formulas for certain family of finite sums, approximation
formulas for the sum of powers of consecutive integers involving the
Bernoulli polynomials,and certain classes conditional probability
involving the Laplace's rule of succession are derived.20 Feb 2024Submitted to Mathematical Methods in the Applied Sciences 22 Feb 2024Review(s) Completed, Editorial Evaluation Pending
03 Mar 2024Reviewer(s) Assigned
07 Oct 2024Editorial Decision: Revise Minor
08 Oct 20241st Revision Received
14 Oct 2024Submission Checks Completed
14 Oct 2024Assigned to Editor
14 Oct 2024Review(s) Completed, Editorial Evaluation Pending
17 Nov 2024Reviewer(s) Assigned
18 Nov 2024Editorial Decision: Accept