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- Toric_manifold abstract "In mathematics, a toric manifold is a topological analogue of toric variety in algebraic geometry. It is an even-dimensional manifold with an effective smooth action of an n-dimensional compact torus which is locally standard with the orbit space a simple convex polytope. The aim is to do combinatorics on the quotient polytope and obtain information on the manifold above. For example the Euler characteristic, cohomology ring of the manifold can be described in terms of the polytope.".
- Toric_manifold wikiPageID "12885890".
- Toric_manifold wikiPageRevisionID "540039927".
- Toric_manifold hasPhotoCollection Toric_manifold.
- Toric_manifold subject Category:Manifolds.
- Toric_manifold subject Category:Structures_on_manifolds.
- Toric_manifold subject Category:Topology.
- Toric_manifold type Artifact100021939.
- Toric_manifold type Conduit103089014.
- Toric_manifold type Manifold103717750.
- Toric_manifold type Manifolds.
- Toric_manifold type Object100002684.
- Toric_manifold type Passage103895293.
- Toric_manifold type PhysicalEntity100001930.
- Toric_manifold type Pipe103944672.
- Toric_manifold type Structure104341686.
- Toric_manifold type StructuresOnManifolds.
- Toric_manifold type Tube104493505.
- Toric_manifold type Way104564698.
- Toric_manifold type Whole100003553.
- Toric_manifold type YagoGeoEntity.
- Toric_manifold type YagoPermanentlyLocatedEntity.
- Toric_manifold comment "In mathematics, a toric manifold is a topological analogue of toric variety in algebraic geometry. It is an even-dimensional manifold with an effective smooth action of an n-dimensional compact torus which is locally standard with the orbit space a simple convex polytope. The aim is to do combinatorics on the quotient polytope and obtain information on the manifold above. For example the Euler characteristic, cohomology ring of the manifold can be described in terms of the polytope.".
- Toric_manifold label "Toric manifold".
- Toric_manifold sameAs m.02x9t9z.
- Toric_manifold sameAs Q7825778.
- Toric_manifold sameAs Q7825778.
- Toric_manifold sameAs Toric_manifold.
- Toric_manifold wasDerivedFrom Toric_manifold?oldid=540039927.
- Toric_manifold isPrimaryTopicOf Toric_manifold.