Further Identities for cmk- and amk-Weighted Sums and a Remark on a Representation of Pythagoras' Equation

Abstract

We present some properties of the expansion coefficients amk and cmk of a pair of dual bases, \[ nm = Σk=2m cmk k(n), \] and \[ m(n) = n + (m-1)(n-1) Bn-1,m-1, \] we introduced earlier in arXiv:2207.01935v1. Here, Ba,b = (a+b)!/(a!\,b!) is a binomial coefficient. We extend the knowledge on the cmk coefficients by giving an explicit expression for them in terms of the Stirling numbers of the second kind. From the interchangeability of the indices of the binomial coefficient, follows the central identity we use here: \[ m(n) - n = n(m) - m. \] With this equation, we evaluate sums of the form \[ Tαm = Σk=2m cmk kα.\] Explicitly, the case Tm1 is handled. Furthermore, we indicate connections of Tm2 and Tm3 to the Mersenne numbers (general integer exponent) and the OEIS entry A024023. We conclude with a small remark on how we can represent Pythagoras' equation in terms of the amk coefficients.