Mean dimension of full shifts
classification
🧮 math.DS
math.GN
keywords
dimensiondimensionalfullmeanalphabetcompactdependingfinite
read the original abstract
Let $K$ be a finite dimensional compact metric space and $K^\mathbb{Z}$ the full shift on the alphabet $K$. We prove that its mean dimension is given by $\dim K$ or $\dim K-1$ depending on the "type" of $K$. We propose a problem which seems interesting from the view point of infinite dimensional topology.
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