Let $\psi:\mathbb{N}\to\mathbb{R}_{\ge0}$ be an arbitrary function from the
positive integers to the non-negative reals. Consider the set $\mathcal{A}$ of
real numbers $\alpha$ for which there are infinitely many reduced fractions
$a/q$ such that $|\alpha-a/q|\le \psi(q)/q$. If $\sum_{q=1}^\infty
\psi(q)\phi(q)/q=\infty$, we show that $\mathcal{A}$ has full Lebesgue measure.
This answers a question of Duffin and Schaeffer. As a corollary, we also
establish a conjecture due to Catlin regarding non-reduced solutions to the
inequality $|\alpha - a/q|\le \psi(q)/q$, giving a refinement of Khinchin's
Theorem.Comment: Final version, 46 pages, to appear in Annals of Mathematics. Fixed a
  typo in equation (14.1) from the previous versio

Koukoulopoulos, Dimitris

Maynard, James

English

arXiv

Let ψ : N → R>0 be an arbitrary function from the positive integers to the nonnegative reals. Consider the set A of real numbers α for which there are infinitely many reduced
fractions a/q such that |α − a/q| 6 ψ(q)/q. If P∞
q=1 ψ(q)ϕ(q)/q = ∞, we show that A has
full Lebesgue measure. This answers a question of Duffin and Schaeffer. As a corollary, we also
establish a conjecture due to Catlin regarding non-reduced solutions to the inequality |α − a/q| 6
ψ(q)/q, giving a refinement of Khinchin’s Theorem

On the Duffin-Schaeffer conjecture

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