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Denjoy's_theorem_on_rotation_number abstract "In mathematics, the Denjoy theorem gives a sufficient condition for a diffeomorphism of the circle to be topologically conjugate to a diffeomorphism of a special kind, namely an irrational rotation. Denjoy (1932) proved the theorem in the course of his topological classification of homeomorphisms of the circle. He also gave an example of a C1 diffeomorphism with an irrational rotation number that is not conjugate to a rotation.".
Denjoy's_theorem_on_rotation_number wikiPageExternalLink feuilleter.php?id=JMPA_1932_9_11.
Denjoy's_theorem_on_rotation_number wikiPageExternalLink dn15.ps.
Denjoy's_theorem_on_rotation_number wikiPageID "4257408".
Denjoy's_theorem_on_rotation_number wikiPageRevisionID "544308114".
Denjoy's_theorem_on_rotation_number hasPhotoCollection Denjoy's_theorem_on_rotation_number.
Denjoy's_theorem_on_rotation_number subject Category:Diffeomorphisms.
Denjoy's_theorem_on_rotation_number subject Category:Dynamical_systems.
Denjoy's_theorem_on_rotation_number subject Category:Theorems_in_dynamical_systems.
Denjoy's_theorem_on_rotation_number subject Category:Theorems_in_topology.
Denjoy's_theorem_on_rotation_number type Abstraction100002137.
Denjoy's_theorem_on_rotation_number type Attribute100024264.
Denjoy's_theorem_on_rotation_number type Communication100033020.
Denjoy's_theorem_on_rotation_number type DynamicalSystem106246361.
Denjoy's_theorem_on_rotation_number type DynamicalSystems.
Denjoy's_theorem_on_rotation_number type Message106598915.
Denjoy's_theorem_on_rotation_number type PhaseSpace100029114.
Denjoy's_theorem_on_rotation_number type Proposition106750804.
Denjoy's_theorem_on_rotation_number type Space100028651.
Denjoy's_theorem_on_rotation_number type Statement106722453.
Denjoy's_theorem_on_rotation_number type Theorem106752293.
Denjoy's_theorem_on_rotation_number type TheoremsInDynamicalSystems.
Denjoy's_theorem_on_rotation_number type TheoremsInTopology.
Denjoy's_theorem_on_rotation_number comment "In mathematics, the Denjoy theorem gives a sufficient condition for a diffeomorphism of the circle to be topologically conjugate to a diffeomorphism of a special kind, namely an irrational rotation. Denjoy (1932) proved the theorem in the course of his topological classification of homeomorphisms of the circle. He also gave an example of a C1 diffeomorphism with an irrational rotation number that is not conjugate to a rotation.".
Denjoy's_theorem_on_rotation_number label "Denjoy's theorem on rotation number".
Denjoy's_theorem_on_rotation_number label "Теорема Данжуа".
Denjoy's_theorem_on_rotation_number sameAs m.0bsqxv.
Denjoy's_theorem_on_rotation_number sameAs Q4454940.
Denjoy's_theorem_on_rotation_number sameAs Q4454940.
Denjoy's_theorem_on_rotation_number sameAs Denjoy's_theorem_on_rotation_number.
Denjoy's_theorem_on_rotation_number wasDerivedFrom Denjoy's_theorem_on_rotation_number?oldid=544308114.
Denjoy's_theorem_on_rotation_number isPrimaryTopicOf Denjoy's_theorem_on_rotation_number.