Lei Jin, Siming Tu
Published 2018-09-06Version 1
We provide a new universal real flow of the Hilbert-cubical type. We prove that any real flow can be equivariantly embedded in the translation on $L(\mathbb{R})^\mathbb{N}$, where $L(\mathbb{R})$ denotes the space of $1$-Lipschitz functions $f:\mathbb{R}\to[0,1]$. Furthermore, all those functions in $L(\mathbb{R})^\mathbb{N}$ that are images of such embeddings can be chosen as $C^1$-functions.
Coinductive properties of Lipschitz functions on streams
Mean dimension of Bernstein spaces and universal real flows
Factor maps and embeddings for random $\mathbb{Z}^d$ shifts of finite type
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