In mathematics, in the topology of 3-manifolds, the sphere theorem of Christos Papakyriakopoulos (1957) gives conditions for elements of the second homotopy group of a 3-manifold to be represented by embedded spheres.
One example is the following:
Let be an orientable 3-manifold such that is not the trivial group. Then there exists a non-zero element of having a representative that is an embedding .
The proof of this version of the theorem can be based on transversality methods, see Jean-Loïc Batude (1971).
Another more general version (also called the projective plane theorem, and due to David B. A. Epstein) is:
Let be any 3-manifold and a -invariant subgroup of . If is a general position map such that and is any neighborhood of the singular set , then there is a map satisfying
- ,
- ,
- is a covering map, and
- is a 2-sided submanifold (2-sphere or projective plane) of .
quoted in (Hempel 1976, p. 54).
References
edit- Batude, Jean-Loïc (1971). "Singularité générique des applications différentiables de la 2-sphère dans une 3-variété différentiable" (PDF). Annales de l'Institut Fourier. 21 (3): 151–172. doi:10.5802/aif.383. MR 0331407.
- Epstein, David B. A. (1961). "Projective planes in 3-manifolds". Proceedings of the London Mathematical Society. 3rd ser. 11 (1): 469–484. doi:10.1112/plms/s3-11.1.469.
- Hempel, John (1976). 3-manifolds. Annals of Mathematics Studies. Vol. 86. Princeton, NJ: Princeton University Press. MR 0415619.
- Papakyriakopoulos, Christos (1957). "On Dehn's lemma and asphericity of knots". Annals of Mathematics. 66 (1): 1–26. doi:10.2307/1970113. JSTOR 1970113. PMC 528404.
- Whitehead, J. H. C. (1958). "On 2-spheres in 3-manifolds". Bulletin of the American Mathematical Society. 64 (4): 161–166. doi:10.1090/S0002-9904-1958-10193-7.