On length of the period of the continued fraction of $n\sqrt{d}$

Filip Gawron, Tomasz Kobos

Published 2021-06-05Version 1

For a given quadratic irrational $\alpha$, let us denote by $D(\alpha)$ the length of the periodic part of the continued fraction expansion of $\alpha$. We prove that for a positive integer $d$, which is not a perfect square, the sequence $(D(n\sqrt{d}))_{n=1}^{\infty}$ has infinitely many limit points.