On Multiplicative Sidon Sets

TL;DR

This paper characterizes the maximum size and density of multiplicative sets avoiding certain products, providing explicit formulas and efficient algorithms for specific cases involving coprime integers.

Contribution

It determines the maximum density of ,b-multiplicative sets and offers an O(1) algorithm for approximating densities in complex cases.

Findings

Maximum density of ,b-multiplicative sets is /(b+g)

Explicit maximum size sets are constructed for all n

Efficient approximation algorithm for specific ,B-multiplicative sets

Abstract

Fix integers $b>a\geq1$ with $g:=\gcd(a,b)$. A set $S\subseteq\mathbb{N}$ is \emph{$\{a,b\}$-multiplicative} if $ax\neq by$ for all $x,y\in S$. 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 $\frac{b}{b+g}$. For $A, B \subseteq \mathbb{N}$, a set $S\subseteq\mathbb{N}$ is \emph{$\{A,B\}$-multiplicative} if $ax=by$ implies $a = b$ and $x = y$ for all $a\in A$ and $b\in B$, and $x,y\in S$. 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.