A generalization to number fields of Euler's theorem on the series of reciprocals of primes

Abstract

Let X be a set of positive integers, and let ZK be the ring of integers of a number field K of degree n. Denote by N(I) the absolute norm of an ideal I of ZK, and by A the set of principal ideals a ZK such that a is an atom of ZK and a divides m for some m ∈ X. Building upon the ideas of Clarkson from [Proc. Amer. Math. Soc. 17 (1966), 541], we show that, if the series Σm ∈ X 1/m diverges, then so does the series Σ a ∈ A |N( a)|-1/n. Most notably, this generalizes a classical theorem of Euler on the series of reciprocals of positive rational primes.