Explicit rank-one constructions for irrational rotations
Abstract
For each {\it well approximable} irrational , we provide an explicit rank-one construction of the -rotation on the circle . This solves "almost surely" a problem by del Junco. For {\it every} irrational , we construct explicitly a rank-one transformation with an eigenvalue . For every irrational , two infinite -finite invariant measures and on are constructed explicitly such that is {\it rigid} and of rank one and is of {\it zero type} and of rank one. The centralizer of the latter system consists of just the powers of . 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