Badly approximable vectors on a vertical Cantor set
Number Theory
2013-07-10 v4 Dynamical Systems
Abstract
For , the set of badly approximable vectors with weight is defined by , where is the distance of to the nearest integer. In 2010 Badziahin-Pollington-Velani solved Schmidt's conjecture which was stated in 1982, proving that is nonempty. Using Badziahin-Pollington-Velani's technique with reference to fractal sets, we were able to improve their results: Assume that we are given a sequence with . Then, the intersection of over all t is nonempty.
Cite
@article{arxiv.1204.0110,
title = {Badly approximable vectors on a vertical Cantor set},
author = {Erez Nesharim},
journal= {arXiv preprint arXiv:1204.0110},
year = {2013}
}