Abstract
Abstract
We show that there is a set
$S \subseteq {\mathbb N}$
with lower density arbitrarily close to
$1$
such that, for each sufficiently large real number
$\alpha $
, the inequality
$|m\alpha -n| \geq 1$
holds for every pair
$(m,n) \in S^2$
. On the other hand, if
$S \subseteq {\mathbb N}$
has density
$1$
, then, for each irrational
$\alpha>0$
and any positive
$\varepsilon $
, there exist
$m,n \in S$
for which
$|m\alpha -n|<\varepsilon $
.
Publisher
Cambridge University Press (CUP)