Weighted upper metric mean dimension for amenable group actions
DOI10.1080/14689367.2019.1709047zbMath1471.37030OpenAlexW2997202843WikidataQ126471723 ScholiaQ126471723MaRDI QIDQ3388732
Dingxuan Tang, Zhiming Li, Hai-Yan Wu
Publication date: 6 May 2021
Published in: Dynamical Systems (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/14689367.2019.1709047
Entropy and other invariants, isomorphism, classification in ergodic theory (37A35) Dynamics induced by group actions other than (mathbb{Z}) and (mathbb{R}), and (mathbb{C}) (37C85) Dynamical systems involving transformations and group actions with special properties (minimality, distality, proximality, expansivity, etc.) (37B05) General groups of measure-preserving transformations and dynamical systems (37A15) Dimension theory of smooth dynamical systems (37C45) Approximate trajectories, pseudotrajectories, shadowing and related notions for topological dynamical systems (37B65)
Related Items (3)
Cites Work
- Minimal subshifts of arbitrary mean topological dimension
- Local entropy theory for a countable discrete amenable group action
- On large deviations for amenable group actions
- Minimal systems of arbitrary large mean topological dimension
- Amenable groups, mean topological dimension and subshifts
- Mean dimension, small entropy factors and an embedding theorem
- Pointwise theorems for amenable groups.
- Mean topological dimension
- Topological invariants of dynamical systems and spaces of holomorphic maps. I.
- Mean dimension and an embedding problem: an example
- Mean topological dimension for actions of discrete amenable groups
- Mean dimension and a sharp embedding theorem: extensions of aperiodic subshifts
- Measure-theoretic pressure for amenable group actions
- Mean dimension and Jaworski-type theorems
- Escape of mass and entropy for geodesic flows
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