Mean dimension and an embedding problem: an example

Mean dimension and Jaworski-type theorems ⋮ Mean dimension of \({\mathbb{Z}^k}\)-actions ⋮ Mean dimension and a non-embeddable example for amenable group actions ⋮ Mean dimension theory in symbolic dynamics for finitely generated amenable groups ⋮ Variational principles for amenable metric mean dimensions ⋮ Embedding minimal dynamical systems into Hilbert cubes ⋮ Mean dimension and metric mean dimension for non-autonomous dynamical systems ⋮ Embedding theorems for discrete dynamical systems and topological flows ⋮ Finite mean dimension and marker property ⋮ Double variational principle for mean dimensions with sub-additive potentials ⋮ On embeddings of extensions of almost finite actions into cubical shifts ⋮ The Hilbert cube contains a minimal subshift of full mean dimension ⋮ The embedding problem in topological dynamics and Takens’ theorem ⋮ Weighted mean topological dimension ⋮ Embedding topological dynamical systems with periodic points in cubical shifts ⋮ An explicit compact universal space for real flows ⋮ Mean dimension and an embedding theorem for real flows ⋮ Genericity of continuous maps with positive metric mean dimension ⋮ Scaled pressure of continuous flows^* ⋮ Minimal subshifts of arbitrary mean topological dimension ⋮ Large dynamics of Yang-Mills theory: mean dimension formula ⋮ Amenable upper mean dimensions ⋮ Weighted upper metric mean dimension for amenable group actions ⋮ Double variational principle for mean dimension ⋮ Sofic mean length ⋮ Upper metric mean dimensions with potential ⋮ Mean topological dimension for random bundle transformations ⋮ Application of signal analysis to the embedding problem of \({\mathbb{Z}}^k\)-actions ⋮ Around the variational principle for metric mean dimension

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• Mean dimension, small entropy factors and an embedding theorem
• Mean topological dimension
• Topological invariants of dynamical systems and spaces of holomorphic maps. I.
• Mean topological dimension for actions of discrete amenable groups
• Embedding ℤ^k-actions in cubical shifts and ℤ^k-symbolic extensions
• Embedding products of graphs into Euclidean spaces