Zbl.No: 627.10035
Autor: Erdös, Paul; Lacampagne, Carole B.; Pomerance, Carl; Selfridge, J.L.
Title: On the Schnirelmann and asymptotic densities of sets of non-multiples. (In English)
Source: Combinatorics, graph theory and computing, Proc. 16th Southeast. Conf., Boca Raton/Fla. 1985, Congr. Numerantium 48, 67-79 (1985).
Review: [For the entire collection see Zbl 619.00006.]
Let \delta(S), \sigma(S) denote the asymptotic density (when it exists), the Schnirelmann density, respectively, of the set of natural numbers not divisible by any element of a set S of natural numbers, and let D(S) = \delta(S)-\sigma(S) \geq 0. When S is a finite set or a subset of the set P of all primes, the authors prove some interesting results concerning D(S); for example: (1) \sup {D(S): S finite} = 1. (2) If S\subset P, there exists S' with S\subset S'\subset P such that \sigma(S') = \sigma(S) and D(S') = 0.
They also derive upper and lower bounds for \sup {D(S): S\subset P}. The paper concludes with a stimulating discussion describing related unsolved problems, their setting and implications.
Reviewer: E.J.Scourfield
Classif.: * 11B05 Topology etc. of sets of numbers 11N37 Asymptotic results on arithmetic functions 11A25 Arithmetic functions, etc.
Keywords: sets of non-multiples; asymptotic density; Schnirelmann density; finite set; upper and lower bounds; unsolved problems
Citations: Zbl 619.00006
