An algorithm for the Faulhaber polynomials

Abstract

Let Sp(n) denote the sum of pth powers of the first n positive integers 1p + 2p + ·s + np. In this paper, first we express Sp(n) in the so-called Faulhaber form, namely, as an even or odd polynomial in (n + 1/2), according as p is odd or even. Then, using the relation Sp(n) - Sp(n-1) = np, we derive a recursive formula for the associated Faulhaber coefficients. Applying Cramer's rule to the corresponding system of equations, we obtain an explicit determinant formula for the said coefficients. Furthermore, we show how to convert the (even or odd) Faulhaber polynomials in (n+ 1/2) into polynomials in S1(n) for any arbitrary p, and vice versa.