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- Lagrangian_Grassmannian abstract "In mathematics, the Lagrangian Grassmannian is the smooth manifold of Lagrangian subspaces of a real symplectic vector space V. Its dimension is n(n+1)/2 (where the dimension of V is 2n). It may be identified with the homogeneous space U(n)/O(n),where U(n) is the unitary group and O(n) the orthogonal group. Following Vladimir Arnold it is denoted by Λ(n). The Lagrangian Grassmannian is a submanifold of the ordinary Grassmannian of V.A complex Lagrangian Grassmannian is the complex homogeneous manifold of Lagrangian subspaces of a complex symplectic vector space V of dimension 2n. It may be identified with the homogeneous space of complex dimension n(n+1)/2Sp(n)/U(n),where Sp(n) is the compact symplectic group.".
- Lagrangian_Grassmannian wikiPageExternalLink maslov.htm.
- Lagrangian_Grassmannian wikiPageID "3231627".
- Lagrangian_Grassmannian wikiPageRevisionID "585625214".
- Lagrangian_Grassmannian hasPhotoCollection Lagrangian_Grassmannian.
- Lagrangian_Grassmannian subject Category:Mathematical_quantization.
- Lagrangian_Grassmannian subject Category:Symplectic_geometry.
- Lagrangian_Grassmannian subject Category:Topology_of_homogeneous_spaces.
- Lagrangian_Grassmannian comment "In mathematics, the Lagrangian Grassmannian is the smooth manifold of Lagrangian subspaces of a real symplectic vector space V. Its dimension is n(n+1)/2 (where the dimension of V is 2n). It may be identified with the homogeneous space U(n)/O(n),where U(n) is the unitary group and O(n) the orthogonal group. Following Vladimir Arnold it is denoted by Λ(n).".
- Lagrangian_Grassmannian label "Indice de Maslov".
- Lagrangian_Grassmannian label "Lagrangian Grassmannian".
- Lagrangian_Grassmannian sameAs Indice_de_Maslov.
- Lagrangian_Grassmannian sameAs m.0900b9.
- Lagrangian_Grassmannian sameAs Q3150398.
- Lagrangian_Grassmannian sameAs Q3150398.
- Lagrangian_Grassmannian wasDerivedFrom Lagrangian_Grassmannian?oldid=585625214.
- Lagrangian_Grassmannian isPrimaryTopicOf Lagrangian_Grassmannian.