English

The Beurling-Wintner problem for characteristic functions

Classical Analysis and ODEs 2024-04-05 v4 Complex Variables Number Theory

Abstract

This paper concerns a long-standing problem raised by Beurling and Wintner on completeness of the dilation system {φ(kx):k=1,2,}\{\varphi(kx):k=1,2,\cdots\} generated by the odd periodic extension on R\mathbb{R} of any φL2[0,1]\varphi\in L^2[0,1]. 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 1V\mathbf{1}_V of an open subset VV of (0,1)(0,1) where VV 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 VV. 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.

Keywords

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

R2 v1 2026-06-23T15:40:30.158Z