English

Separating Bohr denseness from measurable recurrence

Combinatorics 2021-09-02 v3 Dynamical Systems Number Theory

Abstract

We prove that there is a set of integers AA having positive upper Banach density whose difference set AA:={ab:a,bA}A-A:=\{a-b:a,b\in A\} does not contain a Bohr neighborhood of any integer, answering a question asked by Bergelson, Hegyv\'ari, Ruzsa, and the author, in various combinations. In the language of dynamical systems, this result shows that there is a set of integers SS which is dense in the Bohr topology of Z\mathbb Z and which is not a set of measurable recurrence. Our proof yields the following stronger result: if SZS\subseteq \mathbb Z is dense in the Bohr topology of Z\mathbb Z, then there is a set SSS'\subseteq S such that SS' is dense in the Bohr topology of Z\mathbb Z and for all mZ,m\in \mathbb Z, the set (Sm){0}(S'-m)\setminus \{0\} is not a set of measurable recurrence.

Keywords

Cite

@article{arxiv.2002.06994,
  title  = {Separating Bohr denseness from measurable recurrence},
  author = {John T. Griesmer},
  journal= {arXiv preprint arXiv:2002.06994},
  year   = {2021}
}

Comments

20 pages

R2 v1 2026-06-23T13:44:03.342Z