# Generating functions for finite sums involving higher powers of binomial   coefficients: Analysis of hypergeometric functions including new families of   polynomials and numbers

**Authors:** Yilmaz Simsek

arXiv: 1901.02912 · 2021-04-19

## TL;DR

This paper develops generating functions for finite sums involving higher powers of binomial coefficients, introduces new families of polynomials and numbers, and generalizes existing identities using hypergeometric functions.

## Contribution

It constructs new generating functions for combinatorial numbers related to binomial sums, leading to novel identities and polynomial families, including connections to well-known special numbers.

## Key findings

- Derived new identities for binomial power sums
- Identified new polynomial families including Bernoulli, Euler, and Stirling numbers
- Provided integral representations and combinatorial interpretations

## Abstract

The origin of this study is based on not only explicit formulas of finite sums involving higher powers of binomial coefficients, but also explicit evaluations of generating functions for this sums. It should be emphasized that this study contains both new results and literature surveys about some of the related results that have existed so far. With the aid of hypergeometric function, generating functions for a new family of the combinatorial numbers, related to finite sums of powers of binomial coefficients, are constructed. By using these generating functions, a number of new identities have been obtained and at the same time previously well-known formulas and identities have been generalized. Moreover, on this occasion, we identify new families of polynomials including some families of well-known numbers such as Bernoulli numbers, Euler numbers, Stirling numbers, Franel numbers, Catalan numbers, Changhee numbers, Daehee numbers and the others, and also for the polynomials such as the Legendre polynomials, Michael Vowe polynomial, the Mirimanoff polynomial, Golombek type polynomials, and the others. We also give both Riemann and $p$-adic integral representations of these polynomials. Finally, we give combinatorial interpretations of these new families of numbers, polynomials and finite sums of the powers of binomial coefficients. We also give open questions for ordinary generating functions for these numbers.

## Full text

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## References

65 references — full list in the complete paper: https://tomesphere.com/paper/1901.02912/full.md

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Source: https://tomesphere.com/paper/1901.02912