English

Embedding minimal dynamical systems into Hilbert cubes

Dynamical Systems 2015-11-06 v1

Abstract

We study the problem of embedding minimal dynamical systems into the shift action on the Hilbert cube ([0,1]N)Z\left([0,1]^N\right)^{\mathbb{Z}}. This problem is intimately related to the theory of mean dimension, which counts the averaged number of parameters of dynamical systems. Lindenstrauss proved that minimal systems of mean dimension less than N/36N/36 can be embedded into ([0,1]N)Z\left([0,1]^N\right)^{\mathbb{Z}}, and he proposed the problem of finding the optimal value of the mean dimension for the embedding. We solve this problem by proving that minimal systems of mean dimension less than N/2N/2 can be embedded into ([0,1]N)Z\left([0,1]^N\right)^{\mathbb{Z}}. The value N/2N/2 is optimal. The proof uses Fourier and complex analysis.

Keywords

Cite

@article{arxiv.1511.01802,
  title  = {Embedding minimal dynamical systems into Hilbert cubes},
  author = {Yonatan Gutman and Masaki Tsukamoto},
  journal= {arXiv preprint arXiv:1511.01802},
  year   = {2015}
}

Comments

38 pages

R2 v1 2026-06-22T11:38:23.996Z