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- Rotation_number abstract "This article is about the rotation number, which is sometimes called the map winding number or simply winding number. There is another meaning for winding number, which appears in complex analysis.In mathematics, the rotation number is an invariant of homeomorphisms of the circle. It was first defined by Henri Poincaré in 1885, in relation to the precession of the perihelion of a planetary orbit. Poincaré later proved a theorem characterizing the existence of periodic orbits in terms of rationality of the rotation number.".
- Rotation_number wikiPageExternalLink node6.html.
- Rotation_number wikiPageID "3928569".
- Rotation_number wikiPageLength "4334".
- Rotation_number wikiPageOutDegree "35".
- Rotation_number wikiPageRevisionID "607165111".
- Rotation_number wikiPageWikiLink Arnaud_Denjoy.
- Rotation_number wikiPageWikiLink Arnold_tongue.
- Rotation_number wikiPageWikiLink Cantor_set.
- Rotation_number wikiPageWikiLink Category:Dynamical_systems.
- Rotation_number wikiPageWikiLink Category:Fixed_points_(mathematics).
- Rotation_number wikiPageWikiLink Circle.
- Rotation_number wikiPageWikiLink Circle_group.
- Rotation_number wikiPageWikiLink Circle_map.
- Rotation_number wikiPageWikiLink Complex_analysis.
- Rotation_number wikiPageWikiLink Denjoy_diffeomorphism.
- Rotation_number wikiPageWikiLink Denjoy_theorem.
- Rotation_number wikiPageWikiLink Dense_set.
- Rotation_number wikiPageWikiLink Henri_Poincaré.
- Rotation_number wikiPageWikiLink Homeomorphism.
- Rotation_number wikiPageWikiLink Irrational_number.
- Rotation_number wikiPageWikiLink Irrational_rotation.
- Rotation_number wikiPageWikiLink Iterated_function.
- Rotation_number wikiPageWikiLink Lift_(mathematics).
- Rotation_number wikiPageWikiLink Mathematics.
- Rotation_number wikiPageWikiLink Orbit.
- Rotation_number wikiPageWikiLink Orbit_(dynamics).
- Rotation_number wikiPageWikiLink Perihelion.
- Rotation_number wikiPageWikiLink Perihelion_and_aphelion.
- Rotation_number wikiPageWikiLink Periodic_orbit.
- Rotation_number wikiPageWikiLink Periodic_point.
- Rotation_number wikiPageWikiLink Planetary_orbit.
- Rotation_number wikiPageWikiLink Poincaré_map.
- Rotation_number wikiPageWikiLink Poincaré_recurrence.
- Rotation_number wikiPageWikiLink Poincaré_recurrence_theorem.
- Rotation_number wikiPageWikiLink Poincaré_section.
- Rotation_number wikiPageWikiLink Precession.
- Rotation_number wikiPageWikiLink Rational_number.
- Rotation_number wikiPageWikiLink Topological_conjugacy.
- Rotation_number wikiPageWikiLink Topological_property.
- Rotation_number wikiPageWikiLink Winding_number.
- Rotation_number wikiPageWikiLinkText "Rotation number".
- Rotation_number wikiPageWikiLinkText "rotation number".
- Rotation_number curator "Michał Misiurewicz".
- Rotation_number hasPhotoCollection Rotation_number.
- Rotation_number title "Rotation theory".
- Rotation_number urlname "Rotation_theory".
- Rotation_number wikiPageUsesTemplate Template:Scholarpedia.
- Rotation_number subject Category:Dynamical_systems.
- Rotation_number subject Category:Fixed_points_(mathematics).
- Rotation_number type Field.
- Rotation_number type Mechanic.
- Rotation_number type Physic.
- Rotation_number comment "This article is about the rotation number, which is sometimes called the map winding number or simply winding number. There is another meaning for winding number, which appears in complex analysis.In mathematics, the rotation number is an invariant of homeomorphisms of the circle. It was first defined by Henri Poincaré in 1885, in relation to the precession of the perihelion of a planetary orbit.".
- Rotation_number label "Rotation number".
- Rotation_number sameAs Rotationszahl.
- Rotation_number sameAs Nombre_de_rotation.
- Rotation_number sameAs Rotatiegetal.
- Rotation_number sameAs Liczba_obrotu.
- Rotation_number sameAs m.0b75zr.
- Rotation_number sameAs Число_вращения.
- Rotation_number sameAs Q643156.
- Rotation_number sameAs Q643156.
- Rotation_number wasDerivedFrom Rotation_number?oldid=607165111.
- Rotation_number isPrimaryTopicOf Rotation_number.