On Multiplicative Sidon Sets

Abstract

Fix integers b>a≥1 with g:=(a,b). A set S⊂eqN is \a,b\-multiplicative if ax≠ by for all x,y∈ S. For all n, we determine an \a,b\-multiplicative set with maximum cardinality in [n], and conclude that the maximum density of an \a,b\-multiplicative set is bb+g. For A, B ⊂eq N, a set S⊂eqN is \A,B\-multiplicative if ax=by implies a = b and x = y for all a∈ A and b∈ B, and x,y∈ S. For 1 < a < b < c and a, b, c coprime, we give an O(1) time algorithm to approximate the maximum density of an \\a\,\b,c\\-multiplicative set to arbitrary given precision.