On Carmichael and polygonal numbers, Bernoulli polynomials, and sums of base-p digits

Abstract

We give a new characterization of the set C of Carmichael numbers in the context of p-adic theory, independently of the classical results of Korselt and Carmichael. The characterization originates from a surprising link to the denominators of the Bernoulli polynomials via the sum-of-base-p-digits function. More precisely, we show that such a denominator obeys a triple-product identity, where one factor is connected with a p-adically defined subset S of the squarefree integers that contains C. This leads to the definition of a new subset C' of C, called the "primary Carmichael numbers". Subsequently, we establish that every Carmichael number equals an explicitly determined polygonal number. Finally, the set S is covered by modular subsets Sd (d ≥ 1) that are related to the Kn\"odel numbers, where C = S1 is a special case.