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- Sylvester–Gallai_configuration abstract "In geometry, a Sylvester–Gallai configuration consists of a finite subset of the points of a projective space with the property that the line through any two of the points in the subset also passes through at least one other point of the subset.Instead of defining Sylvester–Gallai configurations as subsets of the points of a projective space, they may be defined as abstract incidence structures of points and lines, satisfying the properties that, for every pair of points, the structure includes exactly one line containing the pair and that every line contains at least three points. In this more general form they are also called Sylvester–Gallai designs. A closely related concept is a Sylvester matroid, a matroid with the same property as a Sylvester–Gallai configuration of having no two-point lines.".
- Sylvester–Gallai_configuration wikiPageExternalLink 1980-41.pdf.
- Sylvester–Gallai_configuration wikiPageID "35318593".
- Sylvester–Gallai_configuration wikiPageLength "8347".
- Sylvester–Gallai_configuration wikiPageOutDegree "26".
- Sylvester–Gallai_configuration wikiPageRevisionID "676700925".
- Sylvester–Gallai_configuration wikiPageWikiLink Category:Configurations.
- Sylvester–Gallai_configuration wikiPageWikiLink Configuration_(geometry).
- Sylvester–Gallai_configuration wikiPageWikiLink Discrete_and_Computational_Geometry.
- Sylvester–Gallai_configuration wikiPageWikiLink Elliptic_curve.
- Sylvester–Gallai_configuration wikiPageWikiLink Euclidean_plane.
- Sylvester–Gallai_configuration wikiPageWikiLink Fano_plane.
- Sylvester–Gallai_configuration wikiPageWikiLink Geometry.
- Sylvester–Gallai_configuration wikiPageWikiLink Hesse_configuration.
- Sylvester–Gallai_configuration wikiPageWikiLink Incidence_structure.
- Sylvester–Gallai_configuration wikiPageWikiLink Inflection_point.
- Sylvester–Gallai_configuration wikiPageWikiLink Journal_of_Combinatorial_Theory.
- Sylvester–Gallai_configuration wikiPageWikiLink Matroid.
- Sylvester–Gallai_configuration wikiPageWikiLink Ordered_field.
- Sylvester–Gallai_configuration wikiPageWikiLink Projective_configuration.
- Sylvester–Gallai_configuration wikiPageWikiLink Projective_space.
- Sylvester–Gallai_configuration wikiPageWikiLink Quaternion.
- Sylvester–Gallai_configuration wikiPageWikiLink Real_projective_plane.
- Sylvester–Gallai_configuration wikiPageWikiLink Skew_lines.
- Sylvester–Gallai_configuration wikiPageWikiLink Steiner_system.
- Sylvester–Gallai_configuration wikiPageWikiLink Steiner_triple_system.
- Sylvester–Gallai_configuration wikiPageWikiLink Sylvester_matroid.
- Sylvester–Gallai_configuration wikiPageWikiLink Sylvester–Gallai_theorem.
- Sylvester–Gallai_configuration wikiPageWikiLink Transactions_of_the_American_Mathematical_Society.
- Sylvester–Gallai_configuration wikiPageWikiLink Two-dimensional_space.
- Sylvester–Gallai_configuration wikiPageWikiLinkText "Sylvester–Gallai configuration".
- Sylvester–Gallai_configuration wikiPageWikiLinkText "Sylvester–Gallai design".
- Sylvester–Gallai_configuration authorlink "Jean-Pierre Serre".
- Sylvester–Gallai_configuration first "Jean-Pierre".
- Sylvester–Gallai_configuration hasPhotoCollection Sylvester–Gallai_configuration.
- Sylvester–Gallai_configuration last "Serre".
- Sylvester–Gallai_configuration wikiPageUsesTemplate Template:Citation.
- Sylvester–Gallai_configuration wikiPageUsesTemplate Template:Harvs.
- Sylvester–Gallai_configuration wikiPageUsesTemplate Template:Harvtxt.
- Sylvester–Gallai_configuration year "1966".
- Sylvester–Gallai_configuration subject Category:Configurations.
- Sylvester–Gallai_configuration comment "In geometry, a Sylvester–Gallai configuration consists of a finite subset of the points of a projective space with the property that the line through any two of the points in the subset also passes through at least one other point of the subset.Instead of defining Sylvester–Gallai configurations as subsets of the points of a projective space, they may be defined as abstract incidence structures of points and lines, satisfying the properties that, for every pair of points, the structure includes exactly one line containing the pair and that every line contains at least three points. ".
- Sylvester–Gallai_configuration label "Sylvester–Gallai configuration".
- Sylvester–Gallai_configuration sameAs m.0j7jkcn.
- Sylvester–Gallai_configuration sameAs Q7660854.
- Sylvester–Gallai_configuration sameAs Q7660854.
- Sylvester–Gallai_configuration wasDerivedFrom Sylvester–Gallai_configuration?oldid=676700925.
- Sylvester–Gallai_configuration isPrimaryTopicOf Sylvester–Gallai_configuration.