A note on the hyper-sums of powers of integers, hyperharmonic polynomials and r-Stirling numbers of the first kind
Abstract
Recently, Kargin et al. (arXiv:2008.00284 [math.NT]) obtained (among many other things) the following formula for the hyper-sums of powers of integers Sk(m)(n) equation* Sk(m)(n) = 1m! Σi=0m (-1)i []0ptm+n+1i+n+1n+1 Sk+i(n), equation* where Sk(0)(n) Sk(n) is the ordinary power sum 1k + 2k + ·s + nk. In this note we point out that a formula equivalent to the preceding one was already established in a different form, namely, a form in which []0ptm+n+1i+n+1n+1 is given explicitly as a polynomial in n of degree m-i. We find out the connection between this polynomial and the so-called r-Stirling polynomials of the first kind. Furthermore, we determine the hyperharmonic polynomials and their successive derivatives in terms of the r-Stirling polynomials of the first kind, and show the relationship between the (exponential) complete Bell polynomials and the r-Stirling numbers of the first kind. Finally, we derive some identities involving the Bernoulli numbers and polynomials, the r-Stirling numbers of the first kind, the Stirling numbers of both kinds, and the harmonic numbers.
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