Publications of Paul Erdos

Zentralblatt MATH

Publications of (and about) Paul Erdös

Zbl.No: 469.10036
Autor: Erdös, Paul
Title: Some extremal problems on divisibility properties of sequences of integers. (In English)
Source: Fibonacci Q. 19, 208-213 (1981).
Review: The author studies various properties of subsets A = {a₁ < a₂ < ... < a_k \leq n} of integers from 1 to n. The sequence A is said to have the property P_r(n) if no a_i divides the product of r of the others. A is said to have the property P(n) if no a_i divides the product of the others. It is said to have the property Q(n) if the products a_i a_j are all distinct. To his results in [Izv. Nauk. Inst. Mat. Mekh. Univ. Tomsk 2, 74-82 (1938; Zbl 020.00504)] he adds further results in this paper. to state them he defines some arithmetical functions. Let S_n denote all the integers from 1 to n. Let f_r(n) denote the smallest integer such that S_n can be decomposed into g(n) sets each with the property Q(n). The author proves the results 2n^½ > f_r(n) >> n^½/ log n and 2n^½ > g(n) >> n^1/3/ log n. Next he proves the results that for every \epsilon > 0, there holds n^1-1/r >> f_r(n) >> \epsilon^{n^{1-(1/r)-\epsilon}}. Another result about the divisor properties is that if A has the property that the product of any two a_i is a multiple of all the others, then log(max k) is asymptotic to (\frac{2 log2}{3})\frac{log n}{log log n} as n ––> oo. I wish to quote on more result. Let F(n) be the smallest integer for which S_n can be decomposed into F(n) sets {A_i}1 \leq i \leq F(n) each having the property P. Then

F(n) = nExp((-c+o(1))(log n log log n)^½).

The author discusses many other deep results about sets A with a_i+a_j all distinct and so on. As usual the paper is full of interesting problems and partial solutions (sometimes complete solutions) and i would request the readers to consult the paper for more details.
Reviewer: K.Ramachandra
Classif.: * 11B83 Special sequences of integers and polynomials
11B05 Topology etc. of sets of numbers
11B13 Additive bases
Keywords: extremal problems; divisibility properties; sequences of integers
Citations: Zbl.020.005

Books Problems Set Theory Combinatorics Extremal Probl/Ramsey Th.

Graph Theory Add.Number Theory Mult.Number Theory Analysis Geometry

Probabability Personalia About Paul Erdös Publication Year Home Page

Books	Problems	Set Theory	Combinatorics	Extremal Probl/Ramsey Th.
Graph Theory	Add.Number Theory	Mult.Number Theory	Analysis	Geometry
Probabability	Personalia	About Paul Erdös	Publication Year	Home Page