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- Whitney_immersion_theorem abstract "In differential topology, the Whitney immersion theorem states that for , any smooth -dimensional manifold (required also to be Hausdorff and second-countable) has a one-to-one immersion in Euclidean -space, and a (not necessarily one-to-one) immersion in -space. Similarly, every smooth -dimensional manifold can be immersed in the -dimensional sphere (this removes the constraint).The weak version, for , is due to transversality (general position, dimension counting): two m-dimensional manifolds in intersect generically in a 0-dimensional space.".
- Whitney_immersion_theorem wikiPageExternalLink thesis-final.pdf.
- Whitney_immersion_theorem wikiPageID "1146707".
- Whitney_immersion_theorem wikiPageRevisionID "546494813".
- Whitney_immersion_theorem hasPhotoCollection Whitney_immersion_theorem.
- Whitney_immersion_theorem subject Category:Theorems_in_differential_topology.
- Whitney_immersion_theorem type Abstraction100002137.
- Whitney_immersion_theorem type Communication100033020.
- Whitney_immersion_theorem type Message106598915.
- Whitney_immersion_theorem type Proposition106750804.
- Whitney_immersion_theorem type Statement106722453.
- Whitney_immersion_theorem type Theorem106752293.
- Whitney_immersion_theorem type TheoremsInDifferentialTopology.
- Whitney_immersion_theorem type TheoremsInTopology.
- Whitney_immersion_theorem comment "In differential topology, the Whitney immersion theorem states that for , any smooth -dimensional manifold (required also to be Hausdorff and second-countable) has a one-to-one immersion in Euclidean -space, and a (not necessarily one-to-one) immersion in -space.".
- Whitney_immersion_theorem label "Whitney immersion theorem".
- Whitney_immersion_theorem sameAs m.04b9xc.
- Whitney_immersion_theorem sameAs Q7996769.
- Whitney_immersion_theorem sameAs Q7996769.
- Whitney_immersion_theorem sameAs Whitney_immersion_theorem.
- Whitney_immersion_theorem wasDerivedFrom Whitney_immersion_theorem?oldid=546494813.
- Whitney_immersion_theorem isPrimaryTopicOf Whitney_immersion_theorem.