Results and conjectures related to a conjecture of Erdos concerning primitive sequences

Abstract

A strictly increasing sequence A of positive integers is said to be primitive if no term of A divides any other. Erdos showed that the series Σa ∈ A 1a a, where A is a primitive sequence different from \1\, are all convergent and their sums are bounded above by an absolute constant. Besides, he conjectured that the upper bound of the preceding sums is reached when A is the sequence of the prime numbers. The purpose of this paper is to study the Erdos conjecture. In the first part of the paper, we give two significant conjectures which are equivalent to that of Erdos and in the second one, we study the series of the form Σa ∈ A 1a ( a + x), where x is a fixed non-negative real number and A is a primitive sequence different from \1\. In particular, we prove that the analogue of Erdos's conjecture for those series does not hold, at least for x ≥ 363. At the end of the paper, we propose a more general conjecture than that of Erdos, which concerns the preceding series, and we conclude by raising some open questions.