In differential geometry, the Euler characteristic of an orbifold, or orbifold Euler characteristic, is a generalization of the topological Euler characteristic that includes contributions coming from nontrivial automorphisms. In particular, unlike a topological Euler characteristic, it is not restricted to integer values and is in general a rational number. It is of interest in mathematical physics, specifically in string theory.[1] Given a compact manifold quotiented by a finite group , the Euler characteristic of is
where is the order of the group , the sum runs over all pairs of commuting elements of , and is the space of simultaneous fixed points of and . (The appearance of in the summation is the usual Euler characteristic.)[1][2] If the action is free, the sum has only a single term, and so this expression reduces to the topological Euler characteristic of divided by .[2]
See also
editReferences
edit- ^ a b Dixon, L.; Harvey, J. A.; Vafa, C.; Witten, E. (1985). "Strings on orbifolds" (PDF). Nuclear Physics B. 261: 678–686. doi:10.1016/0550-3213(85)90593-0. Archived from the original (PDF) on 2017-08-12. Retrieved 2018-03-22.
- ^ a b Hirzebruch, Friedrich; Höfer, Thomas (1990). "On the Euler number of an orbifold" (PDF). Mathematische Annalen. 286 (1–3): 255–260. doi:10.1007/BF01453575. S2CID 121791965.
Further reading
edit- Atiyah, Michael; Segal, Graeme (1989). "On equivariant Euler characteristics". Journal of Geometry and Physics. 6 (4): 671–677. doi:10.1016/0393-0440(89)90032-6.
- Leinster, Tom (2008). "The Euler characteristic of a category" (PDF). Documenta Mathematica. 13: 21–49.
External links
edit- https://mathoverflow.net/questions/51993/euler-characteristic-of-orbifolds
- https://mathoverflow.net/questions/267055/is-every-rational-realized-as-the-euler-characteristic-of-some-manifold-or-orbif