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- Rokhlin_lemma abstract "In mathematics, the Rokhlin lemma, or Kakutani–Rokhlin lemma is an important result in ergodic theory. It states that an aperiodic measure preserving dynamical system can be decomposed to an arbitrary high tower of measurable sets and a remainder of arbitrarily small measure. It was proven by Vladimir Abramovich Rokhlin and independently by Shizuo Kakutani. The lemma is used extensively in ergodic theory, for example in Ornstein theory and has many generalizations.".
- Rokhlin_lemma wikiPageID "47894505".
- Rokhlin_lemma wikiPageLength "5816".
- Rokhlin_lemma wikiPageOutDegree "16".
- Rokhlin_lemma wikiPageRevisionID "683089940".
- Rokhlin_lemma wikiPageWikiLink Amenable_group.
- Rokhlin_lemma wikiPageWikiLink Benjamin_Weiss.
- Rokhlin_lemma wikiPageWikiLink Category:Ergodic_theory.
- Rokhlin_lemma wikiPageWikiLink Donald_Samuel_Ornstein.
- Rokhlin_lemma wikiPageWikiLink Elon_Lindenstrauss.
- Rokhlin_lemma wikiPageWikiLink Ergodic_theory.
- Rokhlin_lemma wikiPageWikiLink Homeomorphism.
- Rokhlin_lemma wikiPageWikiLink Measure-preserving_dynamical_system.
- Rokhlin_lemma wikiPageWikiLink Measure_preserving_dynamical_system.
- Rokhlin_lemma wikiPageWikiLink Ornstein_isomorphism_theorem.
- Rokhlin_lemma wikiPageWikiLink Ornstein_theory.
- Rokhlin_lemma wikiPageWikiLink Rokhlins_theorem.
- Rokhlin_lemma wikiPageWikiLink Schwarz_lemma.
- Rokhlin_lemma wikiPageWikiLink Shizuo_Kakutani.
- Rokhlin_lemma wikiPageWikiLink Standard_probability_space.
- Rokhlin_lemma wikiPageWikiLink Topological_dynamical_system.
- Rokhlin_lemma wikiPageWikiLink Topological_dynamics.
- Rokhlin_lemma wikiPageWikiLink Vladimir_Abramovich_Rokhlin.
- Rokhlin_lemma wikiPageWikiLink Zorns_lemma.
- Rokhlin_lemma wikiPageWikiLinkText "Kakutani-Rokhlin lemma".
- Rokhlin_lemma wikiPageWikiLinkText "Rokhlin lemma".
- Rokhlin_lemma hasPhotoCollection Rokhlin_lemma.
- Rokhlin_lemma wikiPageUsesTemplate Template:Reflist.
- Rokhlin_lemma subject Category:Ergodic_theory.
- Rokhlin_lemma hypernym Result.
- Rokhlin_lemma comment "In mathematics, the Rokhlin lemma, or Kakutani–Rokhlin lemma is an important result in ergodic theory. It states that an aperiodic measure preserving dynamical system can be decomposed to an arbitrary high tower of measurable sets and a remainder of arbitrarily small measure. It was proven by Vladimir Abramovich Rokhlin and independently by Shizuo Kakutani. The lemma is used extensively in ergodic theory, for example in Ornstein theory and has many generalizations.".
- Rokhlin_lemma label "Rokhlin lemma".
- Rokhlin_lemma wasDerivedFrom Rokhlin_lemma?oldid=683089940.
- Rokhlin_lemma isPrimaryTopicOf Rokhlin_lemma.