Complete positivity of entropy and non-Bernoullicity for transformation groups

Valentin Golodets; Sergey Sinel'shchikov

Displaying similar documents to “Complete positivity of entropy and non-Bernoullicity for transformation groups”

On the directional entropy for ℤ²-actions on a Lebesgue space

B. Kamiński, K. Park (1999)

Studia Mathematica

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We define the concept of directional entropy for arbitrary $ℤ^{2}$ -actions on a Lebesgue space, we examine its basic properties and consider its behaviour in the class of product actions and rigid actions.

Mixing for dyadic equivalence.

Hasfura-Buenaga, J.R. (1995)

Acta Mathematica Universitatis Comenianae. New Series

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Slow entropy type invariants and smooth realization of commuting measure-preserving transformations

Anatole Katok, Jean-Paul Thouvenot (1997)

Annales de l'I.H.P. Probabilités et statistiques

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On the entropy for group actions on the circle

Eduardo Jorquera (2009)

Fundamenta Mathematicae

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We show that for a finitely generated group of C² circle diffeomorphisms, the entropy of the action equals the entropy of the restriction of the action to the non-wandering set.

The Abramov-Rokhlin Entropy Addition Formula for Amenable Group Actions.

Qing Zhang, Thomas Ward (1992)

Monatshefte für Mathematik

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Spectral and mixing properties of actions of amenable groups.

Avni, Nir (2005)

Electronic Research Announcements of the American Mathematical Society [electronic only]

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Spectrum of multidimensional dynamical systems with positive entropy

B. Kamiński, P. Liardet (1994)

Studia Mathematica

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Applying methods of harmonic analysis we give a simple proof of the multidimensional version of the Rokhlin-Sinaǐ theorem which states that a Kolmogorov $ℤ^{d}$ -action on a Lebesgue space has a countable Lebesgue spectrum. At the same time we extend this theorem to $ℤ^{\infty}$ -actions. Next, using its relative version, we extend to $ℤ^{\infty}$ -actions some other general results connecting spectrum and entropy.

An axiomatic definition of the entropy of a $Z^{d}$ -action on a Lebesgue space

B. Kamiński (1990)

Studia Mathematica

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When every point is either transitive or periodic

Tomasz Downarowicz, Xiangdong Ye (2002)

Colloquium Mathematicae

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We study transitive non-minimal ℕ-actions and ℤ-actions. We show that there are such actions whose non-transitive points are periodic and whose topological entropy is positive. It turns out that such actions can be obtained by perturbing minimal systems under some reasonable assumptions.

The Geometry of Model Spaces for Probability-Preserving Actions of Sofic Groups

Tim Austin (2016)

Analysis and Geometry in Metric Spaces

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Bowen’s notion of sofic entropy is a powerful invariant for classifying probability-preserving actions of sofic groups. It can be defined in terms of the covering numbers of certain metric spaces associated to such an action, the ‘model spaces’. The metric geometry of these model spaces can exhibit various interesting features, some of which provide other invariants of the action. This paper explores an approximate connectedness property of the model spaces, and uses it give a new proof...

Some restriction theorems for the Heisenberg group

S. Thangavelu (1991)

Studia Mathematica

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Entropy pairs of ℤ² and their directional properties

Kyewon Koh Park, Uijung Lee (2004)

Studia Mathematica

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Topological and metric entropy pairs of ℤ²-actions are defined and their properties are investigated, analogously to ℤ-actions. In particular, mixing properties are studied in connection with entropy pairs.