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- Rokhlin's_theorem abstract "In 4-dimensional topology, a branch of mathematics, Rokhlin's theorem states that if a smooth, compact 4-manifold M has a spin structure (or, equivalently, the second Stiefel–Whitney class w2(M) vanishes), then the signature of its intersection form, a quadratic form on the second cohomology group H2(M), is divisible by 16. The theorem is named for Vladimir Rokhlin, who proved it in 1952.".
- Rokhlin's_theorem wikiPageID "7031816".
- Rokhlin's_theorem wikiPageRevisionID "580066760".
- Rokhlin's_theorem hasPhotoCollection Rokhlin's_theorem.
- Rokhlin's_theorem subject Category:4-manifolds.
- Rokhlin's_theorem subject Category:Differential_structures.
- Rokhlin's_theorem subject Category:Geometric_topology.
- Rokhlin's_theorem subject Category:Surgery_theory.
- Rokhlin's_theorem subject Category:Theorems_in_topology.
- Rokhlin's_theorem type Artifact100021939.
- Rokhlin's_theorem type DifferentialStructures.
- Rokhlin's_theorem type Object100002684.
- Rokhlin's_theorem type PhysicalEntity100001930.
- Rokhlin's_theorem type Structure104341686.
- Rokhlin's_theorem type Whole100003553.
- Rokhlin's_theorem type YagoGeoEntity.
- Rokhlin's_theorem type YagoPermanentlyLocatedEntity.
- Rokhlin's_theorem comment "In 4-dimensional topology, a branch of mathematics, Rokhlin's theorem states that if a smooth, compact 4-manifold M has a spin structure (or, equivalently, the second Stiefel–Whitney class w2(M) vanishes), then the signature of its intersection form, a quadratic form on the second cohomology group H2(M), is divisible by 16. The theorem is named for Vladimir Rokhlin, who proved it in 1952.".
- Rokhlin's_theorem label "Rokhlin's theorem".
- Rokhlin's_theorem sameAs m.0h15h8.
- Rokhlin's_theorem sameAs Q7359997.
- Rokhlin's_theorem sameAs Q7359997.
- Rokhlin's_theorem sameAs Rokhlin's_theorem.
- Rokhlin's_theorem wasDerivedFrom Rokhlin's_theorem?oldid=580066760.
- Rokhlin's_theorem isPrimaryTopicOf Rokhlin's_theorem.