On the series of the reciprocals lcm's of sequences of positive integers: A curious interpretation

Abstract

In this paper, we prove the following result: quote Let be an infinite set of positive integers. For all positive integer n, let τn denote the smallest element of which does not divide n. Then we have N + ∞ 1N Σn = 1N τn = Σn = 0∞ 1\a ∈ | a ≤ n\ .quote In the two particular cases when is the set of all positive integers and when is the set of the prime numbers, we give a more precise result for the average asymptotic behavior of (τn)n. Furthermore, we discuss the irrationality of the limit of τn (in the average sense) by applying a result of Erdos.