Weak Pinsker property and Markov processes (Q1821899)
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scientific article; zbMATH DE number 4000284
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Weak Pinsker property and Markov processes |
scientific article; zbMATH DE number 4000284 |
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Weak Pinsker property and Markov processes (English)
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1986
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Pinsker's conjecture was that every ergodic dynamical system can be written as the direct product of a K-system and a system of O-entropy. This was proved to be false by D. Ornstein. Then, J.-P. Thouvenot introduced a weaker notion, called weak Pinsker property: A system has this property if it can be written as the direct product of a Bernoulli and a system of arbitrary small entropy. It is the purpose of the paper to show that all the ergodic \({\mathbb{Z}}^ 2\)-Markov processes have this weak Pinsker property.
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weak Pinsker property
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Bernoulli
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ergodic \({bbfZ}^ 2\)-Markov processes
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