The embedding problem in topological dynamics and Takens' theorem
Abstract
We prove that every -action of mean dimension less than admitting a factor of Rokhlin dimension not greater than embeds in , where , and is the shift on the Hilbert cube ; in particular, when is an irrational -rotation on the -torus, embeds in , which is compared to a previous result by the first named author, Lindenstrauss and Tsukamoto. Moreover, we give a complete and detailed proof of Takens' embedding theorem with a continuous observable for -actions and deduce the analogous result for -actions. Lastly, we show that the Lindenstrauss--Tsukamoto conjecture for -actions holds generically, discuss an analogous conjecture for -actions appearing in a forthcoming paper by the first two authors and Tsukamoto and verify it for -actions on finite dimensional spaces.
Keywords
Cite
@article{arxiv.1708.05972,
title = {The embedding problem in topological dynamics and Takens' theorem},
author = {Yonatan Gutman and Yixiao Qiao and Gabor Szabo},
journal= {arXiv preprint arXiv:1708.05972},
year = {2018}
}
Comments
26 pages; this version is going to appear in Nonlinearity