English

Explicit rank-one constructions for irrational rotations

Dynamical Systems 2022-06-07 v3

Abstract

For each {\it well approximable} irrational θ\theta, we provide an explicit rank-one construction of the e2πiθe^{2\pi i\theta}-rotation RθR_\theta on the circle T\Bbb T. This solves "almost surely" a problem by del Junco. For {\it every} irrational θ\theta, we construct explicitly a rank-one transformation with an eigenvalue e2πiθe^{2\pi i\theta}. For every irrational θ\theta, two infinite σ\sigma-finite invariant measures μθ\mu_\theta and μθ\mu_{\theta}' on T\Bbb T are constructed explicitly such that (T,μθ,Rθ)(\Bbb T,\mu_\theta, R_\theta) is {\it rigid} and of rank one and (T,μθ,Rθ)(\Bbb T,\mu_\theta', R_\theta) is of {\it zero type} and of rank one. The centralizer of the latter system consists of just the powers of RθR_\theta. Some versions of the aforementioned results are proved under an extra condition on boundedness of the sequence of cuts in the rank-one construction.

Keywords

Cite

@article{arxiv.2111.07375,
  title  = {Explicit rank-one constructions for irrational rotations},
  author = {Alexandre I. Danilenko and Mykyta I. Vieprik},
  journal= {arXiv preprint arXiv:2111.07375},
  year   = {2022}
}

Comments

A transliteration flaw in the name of the second named author is removed

R2 v1 2026-06-24T07:37:51.601Z