Erdos's integer dilation approximation problem and GCD graphs

Abstract

Let A⊂R≥slant1 be a countable set such that x∞1 xΣα∈A[1,x]1α>0. We prove that, for every >0, there exist infinitely many pairs (α, β)∈ A2 such that α≠ β and |nα-β| < for some positive integer n. This resolves a problem of Erdos from 1948. A critical role in the proof is played by the machinery of GCD graphs, which were introduced by the first author and by James Maynard in their work on the Duffin--Schaeffer conjecture in Diophantine approximation.

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