Gap Statistics of the Sequence $\{\alpha\sqrt{n}\}$
Dynamical Systems
2020-05-21 v2 Number Theory
Abstract
The gaps in the sequence were shown by Elkies-McMullen (2004) to have a limiting distribution which is not the exponential distribution. However it is conjectured that the distribution of gaps in the sequence is exponential, provided is irrational. For almost all values of , we prove an important step in this direction. In particular, we show that all the correlations are Poissonian along a subsequence. Therefore, our result implies that the gap distribution converges to the exponential distribution along the same subsequence.
Cite
@article{arxiv.2004.07646,
title = {Gap Statistics of the Sequence $\{\alpha\sqrt{n}\}$},
author = {Christopher Lutsko},
journal= {arXiv preprint arXiv:2004.07646},
year = {2020}
}
Comments
A gap was found in the proof