On constant-multiple-free sets contained in a random set of integers

Abstract

For a rational number r>1, a set A of positive integers is called an r-multiple-free set if A does not contain any solution of the equation rx = y. The extremal problem on estimating the maximum possible size of r-multiple-free sets contained in [n]:=1,2,...,n has been studied for its own interest in combinatorial number theory and application to coding theory. Let a, b be positive integers such that a<b and the greatest common divisor of a and b is 1. Wakeham and Wood showed that the maximum size of (b/a)-multiple-free sets contained in [n] is bb+1n+O( n). In this paper we generalize this result as follows. For a real number p∈ (0,1), let [n]p be a set of integers obtained by choosing each element i∈ [n] randomly and independently with probability p. We show that the maximum possible size of (b/a)-multiple-free sets contained in [n]p is bb+ppn+O(pn n n) with probability that goes to 1 as n ∞.