English

Strong characterizing sequences of countable groups

Number Theory 2008-07-10 v1

Abstract

Andr\'as Bir\'o and Vera S\'os prove that for any subgroup GG of \T\T generated freely by finitely many generators there is a sequence ANA\subset \N such that for all β\T\beta \in \T we have (.\|.\| denotes the distance to the nearest integer) βGnAnβ<,βGlim supnA,nnβ>0.\beta\in G \Rightarrow \sum_{n\in A} \| n \beta\| < \infty,\quad \quad \quad \beta\notin G \Rightarrow \limsup_{n\in A, n \to \infty} \|n \beta\| > 0. We extend this result to arbitrary countable subgroups of \T\T. We also show that not only the sum of norms but the sum of arbitrary small powers of these norms can be kept small. Our proof combines ideas from the above article with new methods, involving a filter characterization of subgroups of \T\T.

Keywords

Cite

@article{arxiv.0807.1455,
  title  = {Strong characterizing sequences of countable groups},
  author = {Mathias Beiglböck},
  journal= {arXiv preprint arXiv:0807.1455},
  year   = {2008}
}
R2 v1 2026-06-21T10:58:54.885Z