Chacon's Type Ergodic Transformations with Unbounded Arithmetic Spacers
Abstract
The following generalizations of the Chacon map are proposed: instead of classical constant spacer sequence let a sequence be one with unbounded . (We mention also an analogue of the historical Chacon map with spacer sequences in the form .) This narrow class of rank-one transformations may be abundant source of open questions. All such constructions have partial rigidity, but some other properties could be different. For root sequence, , (or ) the corresponding action is rigid, moreover it possesses all polynomials in its weak closure. In the linear case we get (as well as for the classical Chacon transformation) the property of minimal self-joinings (MSJ). We present some observations about MSJ, mild mixing, partial mixing, -mixing, absence of factors, triviality of centralizer and spectral primality, state several problems, and mention exponential "self-similar" Chacon transformations and flows on infinite measure spaces.
Cite
@article{arxiv.1311.4524,
title = {Chacon's Type Ergodic Transformations with Unbounded Arithmetic Spacers},
author = {V. V. Ryzhikov},
journal= {arXiv preprint arXiv:1311.4524},
year = {2013}
}
Comments
Ergodic theory