On strong infinite Sidon and Bh sets and random sets of integers

Abstract

A set of integers S ⊂ N is an α-strong Sidon set if the pairwise sums of its elements are far apart by a certain measure depending on α, more specifically if | (x+w) - (y+z) | ≥ \ xα,yα,zα,wα \ for every x,y,z,w ∈ S satisfying \x,w\ ≠ \y,z\. We obtain a new lower bound for the growth of α-strong infinite Sidon sets when 0 ≤ α < 1. We also further extend that notion in a natural way by obtaining the first non-trivial bound for α-strong infinite Bh sets. In both cases, we study the implications of these bounds for the density of, respectively, the largest Sidon or Bh set contained in a random infinite subset of N. Our theorems improve on previous results by Kohayakawa, Lee, Moreira and R\"odl.