On a Theorem of Nathanson on Diophantine Approximation

Jaroslav Hančl, Tho Phuoc Nguyen

Published 2024-07-16Version 1

In 1974, M. B. Nathanson proved that every irrational number $\alpha$ represented by a simple continued fraction with infinitely many elements greater than or equal to $k$ is approximable by an infinite number of rational numbers $p/q$ satisfying $|\alpha-p/q|<1/(\sqrt{k^2+4}q^2)$. In this paper we refine this result.