English

The embedding problem in topological dynamics and Takens' theorem

Dynamical Systems 2018-10-04 v2

Abstract

We prove that every Zk\mathbb{Z}^{k}-action (X,Zk,T)(X,\mathbb{Z}^{k},T) of mean dimension less than D/2D/2 admitting a factor (Y,Zk,S)(Y,\mathbb{Z}^{k},S) of Rokhlin dimension not greater than LL embeds in (([0,1](L+1)D)Zk×Y,σ×S)(([0,1]^{(L+1)D})^{\mathbb{Z}^{k}}\times Y,\sigma\times S), where DND\in\mathbb{N}, LN{0}L\in\mathbb{N}\cup\{0\} and σ\sigma is the shift on the Hilbert cube ([0,1](L+1)D)Zk([0,1]^{(L+1)D})^{\mathbb{Z}^{k}}; in particular, when (Y,Zk,S)(Y,\mathbb{Z}^{k},S) is an irrational Zk\mathbb{Z}^{k}-rotation on the kk-torus, (X,Zk,T)(X,\mathbb{Z}^{k},T) embeds in (([0,1]2kD+1)Zk,σ)(([0,1]^{2^kD+1})^{\mathbb{Z}^k},\sigma), 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 Z\mathbb{Z}-actions and deduce the analogous result for Zk\mathbb{Z}^{k}-actions. Lastly, we show that the Lindenstrauss--Tsukamoto conjecture for Z\mathbb{Z}-actions holds generically, discuss an analogous conjecture for Zk\mathbb{Z}^{k}-actions appearing in a forthcoming paper by the first two authors and Tsukamoto and verify it for Zk\mathbb{Z}^{k}-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

R2 v1 2026-06-22T21:18:52.900Z