A generalization of a theorem of Nagell

Abstract

Let n be a positive integer. In 1915, Theisinger proved that if n 2, then the n-th harmonic sum Σk=1n1k is not an integer. Let a and b be positive integers. In 1923, Nagell extended Theisinger's theorem by showing that the reciprocal sum Σk=1n1a+(k-1)b is not an integer if n 2. In 1946, Erdos and Niven proved a theorem of a similar nature that states that there is only a finite number of integers n for which one or more of the elementary symmetric functions of 1,1/2, ..., 1/n is an integer. In this paper, we present a generalization of Nagell's theorem. In fact, we show that for arbitrary n positive integers s1, ..., sn (not necessarily distinct and not necessarily monotonic), the following reciprocal power sum Σk=1n1(a+(k-1)b)sk is never an integer if n 2. The proof of our result is analytic and p-adic in character.