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Almost_symplectic_manifold abstract "In differential geometry, an almost symplectic structure on a differentiable manifold M is a two-form ω on M which is everywhere non-singular. If, in addition, ω is closed, then it is a symplectic form.An almost symplectic manifold is an Sp-structure; requiring ω to be closed is an integrability condition.".
Almost_symplectic_manifold wikiPageID "11630694".
Almost_symplectic_manifold wikiPageRevisionID "558975981".
Almost_symplectic_manifold hasPhotoCollection Almost_symplectic_manifold.
Almost_symplectic_manifold subject Category:Smooth_manifolds.
Almost_symplectic_manifold subject Category:Symplectic_geometry.
Almost_symplectic_manifold type Artifact100021939.
Almost_symplectic_manifold type Conduit103089014.
Almost_symplectic_manifold type Manifold103717750.
Almost_symplectic_manifold type Object100002684.
Almost_symplectic_manifold type Passage103895293.
Almost_symplectic_manifold type PhysicalEntity100001930.
Almost_symplectic_manifold type Pipe103944672.
Almost_symplectic_manifold type SmoothManifolds.
Almost_symplectic_manifold type Structure104341686.
Almost_symplectic_manifold type StructuresOnManifolds.
Almost_symplectic_manifold type Tube104493505.
Almost_symplectic_manifold type Way104564698.
Almost_symplectic_manifold type Whole100003553.
Almost_symplectic_manifold type YagoGeoEntity.
Almost_symplectic_manifold type YagoPermanentlyLocatedEntity.
Almost_symplectic_manifold comment "In differential geometry, an almost symplectic structure on a differentiable manifold M is a two-form ω on M which is everywhere non-singular. If, in addition, ω is closed, then it is a symplectic form.An almost symplectic manifold is an Sp-structure; requiring ω to be closed is an integrability condition.".
Almost_symplectic_manifold label "Almost symplectic manifold".
Almost_symplectic_manifold sameAs m.02rm25_.
Almost_symplectic_manifold sameAs Q4734008.
Almost_symplectic_manifold sameAs Q4734008.
Almost_symplectic_manifold sameAs Almost_symplectic_manifold.
Almost_symplectic_manifold wasDerivedFrom Almost_symplectic_manifold?oldid=558975981.
Almost_symplectic_manifold isPrimaryTopicOf Almost_symplectic_manifold.