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• Stable_normal_bundle abstract "In surgery theory, a branch of mathematics, the stable normal bundle of a differentiable manifold is an invariant which encodes the stable normal (dually, tangential) data. There are analogs for generalizations of manifold, notably PL-manifolds and topological manifolds. There is also an analogue in homotopy theory for Poincaré spaces, the Spivak spherical fibration, named after Michael Spivak (reference below).".
• Stable_normal_bundle wikiPageID "9901365".
• Stable_normal_bundle wikiPageRevisionID "526449038".
• Stable_normal_bundle hasPhotoCollection Stable_normal_bundle.
• Stable_normal_bundle subject Category:Differential_geometry.
• Stable_normal_bundle subject Category:Surgery_theory.
• Stable_normal_bundle comment "In surgery theory, a branch of mathematics, the stable normal bundle of a differentiable manifold is an invariant which encodes the stable normal (dually, tangential) data. There are analogs for generalizations of manifold, notably PL-manifolds and topological manifolds. There is also an analogue in homotopy theory for Poincaré spaces, the Spivak spherical fibration, named after Michael Spivak (reference below).".
• Stable_normal_bundle label "Stabiles Normalenbündel".
• Stable_normal_bundle label "Stable normal bundle".
• Stable_normal_bundle sameAs Stabiles_Normalenbündel.
• Stable_normal_bundle sameAs m.02pwf8x.
• Stable_normal_bundle sameAs Q7595772.
• Stable_normal_bundle sameAs Q7595772.
• Stable_normal_bundle wasDerivedFrom Stable_normal_bundle?oldid=526449038.
• Stable_normal_bundle isPrimaryTopicOf Stable_normal_bundle.