Extremal problems for GCDs

Abstract

We prove that if A ⊂eq [X, 2X] and B ⊂eq [Y, 2Y] are sets of integers such that (a,b) ≥ D for at least δ |A||B| pairs (a,b) ∈ A × B then |A||B| δ-2 - XY/D2. This is a new result even when δ = 1. The proof uses ideas of Koukoulopoulos and Maynard and some additional combinatorial arguments.