A note on another approach on power sums

Abstract

In this note, we first review the novel approach to power sums put forward recently by Muschielok in arXiv:2207.01935v1, which can be summarized by the formula Sm(a)(n) = Σk cmk k(a)(n), where the cmk's are the expansion coefficients and where the basis functions m(a)(n) fulfil the recursive property m(a+1)(n)= Σi=1n m(a)(i). Then, we point out a number of supplementary facts concerning the said approach not contemplated explicitly in Muschielok's paper. In particular, we show that, for any given m, the values of the cmk's can be obtained by inverting a matrix involving only binomial coefficients. This may be compared with the original approach of Muschielok, where the values of the cmk's can be obtained by inverting a lower triangular matrix involving the Stirling numbers of the first kind. Also, we make a conjecture about the functional form of the coefficients cm\, m-k.