Power-Sum Denominators
Abstract
The power sum 1n + 2n + ·s + xn has been of interest to mathematicians since classical times. Johann Faulhaber, Jacob Bernoulli, and others who followed expressed power sums as polynomials in x of degree n+1 with rational coefficients. Here we consider the denominators of these polynomials, and prove some of their properties. A remarkable one is that such a denominator equals n+1 times the squarefree product of certain primes p obeying the condition that the sum of the base-p digits of n+1 is at least p. As an application, we derive a squarefree product formula for the denominators of the Bernoulli polynomials.
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