English

Nil Bohr$_0$-sets, Poincar\'e recurrence and generalized polynomials

Dynamical Systems 2011-09-19 v1 Combinatorics Group Theory

Abstract

The problem which can be viewed as the higher order version of an old question concerning Bohr sets is investigated: for any dNd\in \N does the collection of {nZ:S(Sn)...(Sdn)}\{n\in \Z: S\cap (S-n)\cap...\cap (S-dn)\neq \emptyset\} with SS syndetic coincide with that of Nild_d Bohr0_0-sets? In this paper it is proved that Nild_d Bohr0_0-sets could be characterized via generalized polynomials, and applying this result one side of the problem could be answered affirmatively: for any Nild_d Bohr0_0-set AA, there exists a syndetic set SS such that A{nZ:S(Sn)...(Sdn)}.A\supset \{n\in \Z: S\cap (S-n)\cap...\cap (S-dn)\neq \emptyset\}. Note that other side of the problem can be deduced from some result by Bergelson-Host-Kra if modulo a set with zero density. As applications it is shown that the two collections coincide dynamically, i.e. both of them can be used to characterize higher order almost automorphic points.

Cite

@article{arxiv.1109.3636,
  title  = {Nil Bohr$_0$-sets, Poincar\'e recurrence and generalized polynomials},
  author = {Wen Huang and Song Shao and Xiangdong Ye},
  journal= {arXiv preprint arXiv:1109.3636},
  year   = {2011}
}

Comments

50 pages

R2 v1 2026-06-21T19:06:02.394Z