When every point is either transitive or periodic

Tomasz Downarowicz; Xiangdong Ye

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Displaying similar documents to “When every point is either transitive or periodic”

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.

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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$ℂ^{*}$ -actions on $ℂ^{3}$ are linearizable.

Kaliman, Shulim I., Koras, Mariusz, Makar-Limanov, Leonid, Russell, Peter (1997)

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

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Group Actions Having One Fixed Point.

John Ewing, Robert Stong (1986)

Mathematische Zeitschrift

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Complete positivity of entropy and non-Bernoullicity for transformation groups

Valentin Golodets, Sergey Sinel'shchikov (2000)

Colloquium Mathematicae

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The existence of non-Bernoullian actions with completely positive entropy is proved for a class of countable amenable groups which includes, in particular, a class of Abelian groups and groups with non-trivial finite subgroups. For this purpose, we apply a reverse version of the Rudolph-Weiss theorem.

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.

Fixed point sets of smooth group actions on disks and Euclidean spaces. A survey

Krzysztof Pawałowski (1986)

Banach Center Publications

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The action of groups on real factors of type III $_{λ}$ , $λ \neq 1$ .

Rakhimov, A.A. (2004)

Zapiski Nauchnykh Seminarov POMI

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Pseudofree Actions and Hurwitz's 84(g-l) Theorem.

R.S. Kulkarni (1982)

Mathematische Annalen

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Triangular Actions on C3.

Dennis M. Snow (1988)

Manuscripta mathematica

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Amenable actions of nonamenable groups.

Grigorchuk, R.I., Nekrashevych, V.Yu. (2005)

Zapiski Nauchnykh Seminarov POMI

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Mixing for dyadic equivalence.

Hasfura-Buenaga, J.R. (1995)

Acta Mathematica Universitatis Comenianae. New Series

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A New Approach to the Rigidity of Discrete Group Actions.

M. Kanai (1996)

Geometric and functional analysis

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Corrections to the paper "A remark on the orbit spaces under multiplicative group actions''

Jerzy Jurkiewicz (1989)

Colloquium Mathematicae

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Full cooperation applied to environmental improvements

Monique Jeanblanc, Rafał M. Łochowski, Wojciech Szatzschneider (2015)

Banach Center Publications

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We analyse the case of certificates of environmental improvements and full cooperation of two identical agents. We model pollution levels as geometric Brownian motions with quadratic costs of improvements. Our main result is the construction of the optimal improvements strategy in the case of separate actions, collusive actions and fusion. In certain range of the model parameters, the fusion solution generates lower pollution levels than separate and collusive actions.

A characterization of light open mappings and the existence of group actions

Louis F. McAuley (1977)

Colloquium Mathematicae

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