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- Equichordal_point_problem abstract "In Euclidean plane geometry, the equichordal point problem is the question whether a closed planar convex body can have two equichordal points. The problem was originally posed in 1916 by Fujiwara and in 1917 by Wilhelm Blaschke, Hermann Rothe, and Roland Weitzenböck. A generalization of this problem statement was answered in the negative in 1997 by Marek R. Rychlik.".
- Equichordal_point_problem wikiPageID "29744555".
- Equichordal_point_problem wikiPageLength "6713".
- Equichordal_point_problem wikiPageOutDegree "33".
- Equichordal_point_problem wikiPageRevisionID "608656515".
- Equichordal_point_problem wikiPageWikiLink Algebraic_geometry_and_analytic_geometry.
- Equichordal_point_problem wikiPageWikiLink Analytic_function.
- Equichordal_point_problem wikiPageWikiLink Category:Convex_geometry.
- Equichordal_point_problem wikiPageWikiLink Category:Dynamical_systems.
- Equichordal_point_problem wikiPageWikiLink Category:Theorems_in_geometry.
- Equichordal_point_problem wikiPageWikiLink Chord_(geometry).
- Equichordal_point_problem wikiPageWikiLink Chordal_problem.
- Equichordal_point_problem wikiPageWikiLink Circle.
- Equichordal_point_problem wikiPageWikiLink Complex_analysis.
- Equichordal_point_problem wikiPageWikiLink Complexification.
- Equichordal_point_problem wikiPageWikiLink Convex_body.
- Equichordal_point_problem wikiPageWikiLink Convex_function.
- Equichordal_point_problem wikiPageWikiLink Curve.
- Equichordal_point_problem wikiPageWikiLink Equichordal_point.
- Equichordal_point_problem wikiPageWikiLink Euclidean_geometry.
- Equichordal_point_problem wikiPageWikiLink Hermann_Rothe.
- Equichordal_point_problem wikiPageWikiLink Jordan_curve_theorem.
- Equichordal_point_problem wikiPageWikiLink Liouvilles_theorem_(complex_analysis).
- Equichordal_point_problem wikiPageWikiLink Normally_hyperbolic_invariant_manifold.
- Equichordal_point_problem wikiPageWikiLink Perturbation_problem_beyond_all_orders.
- Equichordal_point_problem wikiPageWikiLink Plane_(geometry).
- Equichordal_point_problem wikiPageWikiLink Roland_Weitzenböck.
- Equichordal_point_problem wikiPageWikiLink Stable_manifold.
- Equichordal_point_problem wikiPageWikiLink Star_domain.
- Equichordal_point_problem wikiPageWikiLink Symmetry.
- Equichordal_point_problem wikiPageWikiLink Ushikis_theorem.
- Equichordal_point_problem wikiPageWikiLink Wilhelm_Blaschke.
- Equichordal_point_problem wikiPageWikiLinkText "Equichordal point problem".
- Equichordal_point_problem wikiPageWikiLinkText "equichordal point problem".
- Equichordal_point_problem wikiPageUsesTemplate Template:Reflist.
- Equichordal_point_problem subject Category:Convex_geometry.
- Equichordal_point_problem subject Category:Dynamical_systems.
- Equichordal_point_problem subject Category:Theorems_in_geometry.
- Equichordal_point_problem hypernym Question.
- Equichordal_point_problem type Work.
- Equichordal_point_problem type Field.
- Equichordal_point_problem type Mechanic.
- Equichordal_point_problem type Physic.
- Equichordal_point_problem type Redirect.
- Equichordal_point_problem type Theorem.
- Equichordal_point_problem comment "In Euclidean plane geometry, the equichordal point problem is the question whether a closed planar convex body can have two equichordal points. The problem was originally posed in 1916 by Fujiwara and in 1917 by Wilhelm Blaschke, Hermann Rothe, and Roland Weitzenböck. A generalization of this problem statement was answered in the negative in 1997 by Marek R. Rychlik.".
- Equichordal_point_problem label "Equichordal point problem".
- Equichordal_point_problem sameAs Q5384440.
- Equichordal_point_problem sameAs Problema_do_ponto_equicordal.
- Equichordal_point_problem sameAs m.0fq26mt.
- Equichordal_point_problem sameAs Q5384440.
- Equichordal_point_problem wasDerivedFrom Equichordal_point_problem?oldid=608656515.
- Equichordal_point_problem isPrimaryTopicOf Equichordal_point_problem.