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- Lebrun_manifold abstract "In mathematics, a Lebrun manifold is a connected sum of copies of the complex projective plane, equipped with an explicit self-dual metric. Here, self-dual means that the Weyl tensor is its own Hodge star. The metricis determined by the choice of a finite collection of points in hyperbolic 3-space. These metrics were discovered by Claude LeBrun (1991), and named after LeBrun by Atiyah and Witten (2002).".
- Lebrun_manifold wikiPageExternalLink 0107177.
- Lebrun_manifold wikiPageExternalLink 1214446999.
- Lebrun_manifold wikiPageID "35068126".
- Lebrun_manifold wikiPageRevisionID "545061646".
- Lebrun_manifold authorlink "Claude LeBrun".
- Lebrun_manifold first "Claude".
- Lebrun_manifold hasPhotoCollection Lebrun_manifold.
- Lebrun_manifold last "LeBrun".
- Lebrun_manifold year "1991".
- Lebrun_manifold subject Category:Differential_geometry.
- Lebrun_manifold comment "In mathematics, a Lebrun manifold is a connected sum of copies of the complex projective plane, equipped with an explicit self-dual metric. Here, self-dual means that the Weyl tensor is its own Hodge star. The metricis determined by the choice of a finite collection of points in hyperbolic 3-space. These metrics were discovered by Claude LeBrun (1991), and named after LeBrun by Atiyah and Witten (2002).".
- Lebrun_manifold label "Lebrun manifold".
- Lebrun_manifold sameAs m.0j63l3s.
- Lebrun_manifold sameAs Q6511432.
- Lebrun_manifold sameAs Q6511432.
- Lebrun_manifold wasDerivedFrom Lebrun_manifold?oldid=545061646.
- Lebrun_manifold isPrimaryTopicOf Lebrun_manifold.