Missing digits points near manifolds
Abstract
We consider a problem concerning the distribution of points with missing digits coordinates that are close to non-degenerate analytic submanifolds. We show that large enough (to be specified in the paper) sets of points with missing digits coordinates distribute 'equally' around non-degenerate submanifolds. As a consequence, we show that intersecting those missing digits sets with non-degenerate submanifolds always achieve the optimal dimension reduction. On the other hand, we also prove that there is no lack of points with missing digits that are contained in non-degenerate submanifolds. Among the other results, 1. we prove that the pinned distance sets of those missing digits sets contain non-trivial intervals regardless of where the pin is. 2. we prove that for each for missing digits sets with large bases, simple digit sets (to be specified in the paper), and the arithmetic product sets contains non-trivial intervals.
Cite
@article{arxiv.2309.00130,
title = {Missing digits points near manifolds},
author = {Han Yu},
journal= {arXiv preprint arXiv:2309.00130},
year = {2023}
}