1. Density of the level sets of the metric mean dimension for homeomorphisms
- Author
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Acevedo, Jeovanny de Jesus Muentes, Ibarra, Sergio Romaña, and Cantillo, Raibel Arias
- Subjects
Mathematics - Dynamical Systems - Abstract
Let $N$ be an $n$-dimensional compact riemannian manifold, with $n\geq 2$. In this paper, we prove that for any $\alpha\in [0,n]$, the set consisting of homeomorphisms on $N$ with lower and upper metric mean dimensions equal to $\alpha$ is dense in $\text{Hom}(N)$. More generally, given $\alpha,\beta\in [0,n]$, with $\alpha\leq \beta$, we show the set consisting of homeomorphisms on $N$ with lower metric mean dimension equal to $\alpha$ and upper metric mean dimension equal to $\beta$ is dense in $\text{Hom}(N)$. Furthermore, we also give a proof that the set of homeomorphisms with upper metric mean dimension equal to $n$ is residual in $\text{Hom}(N)$.
- Published
- 2022
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