The Beurling-Wintner problem for characteristic functions
Abstract
This paper concerns a long-standing problem raised by Beurling and Wintner on completeness of the dilation system generated by the odd periodic extension on of any . Up to now there has been no explicit description of solutions of the Beurling-Wintner problem even for characteristic functions. We focus on characteristic function of an open subset of where is the union of finitely many intervals with rational endpoints. Using substantially techniques from analytic number theory, we fully solved the Beurling-Wintner problem in most interesting situations and exhibit the explicit form of such . As a consequence, it yields a complete solution for the rational version of Kozlov's problem. Moreover, we find that the Beurling-Wintner problem is closely related to the Twin Prime Conjecture and the Sophie Germain Prime Conjecture.
Cite
@article{arxiv.2005.09779,
title = {The Beurling-Wintner problem for characteristic functions},
author = {Hui Dan and Kunyu Guo},
journal= {arXiv preprint arXiv:2005.09779},
year = {2024}
}
Comments
75 pages