In mathematics, an Eells–Kuiper manifold is a compactification of by a sphere of dimension , where , or . It is named after James Eells and Nicolaas Kuiper.
If , the Eells–Kuiper manifold is diffeomorphic to the real projective plane . For it is simply-connected and has the integral cohomology structure of the complex projective plane (), of the quaternionic projective plane () or of the Cayley projective plane ().
Properties
These manifolds are important in both Morse theory and foliation theory:
Theorem:[1] Let be a connected closed manifold (not necessarily orientable) of dimension . Suppose admits a Morse function of class with exactly three singular points. Then is a Eells–Kuiper manifold.
Theorem:[2] Let be a compact connected manifold and a Morse foliation on . Suppose the number of centers of the foliation is more than the number of saddles . Then there are two possibilities:
- , and is homeomorphic to the sphere ,
- , and is an Eells–Kuiper manifold, or .
See also
References
- ↑ Eells, James, Jr.; Kuiper, Nicolaas H. (1962), "Manifolds which are like projective planes", Publications Mathématiques de l'IHÉS (14): 5–46, MR 0145544
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: CS1 maint: multiple names: authors list (link). - ↑ Camacho, César; Scárdua, Bruno (2008), "On foliations with Morse singularities", Proceedings of the American Mathematical Society, 136 (11): 4065–4073, arXiv:math/0611395, doi:10.1090/S0002-9939-08-09371-4, MR 2425748.