Complex torus

In mathematics, a complex torus is a particular kind of complex manifold M whose underlying smooth manifold is a torus in the usual sense (i.e. the cartesian product of some number N circles). Here N must be the even number 2n, where n is the complex dimension of M.

The complex torus associated to a lattice spanned by two periods, ω1 and ω2. Corresponding edges are identified.

All such complex structures can be obtained as follows: take a lattice Λ in Cn considered as real vector space; then the quotient group

Cn/Λ

is a compact complex manifold. All complex tori, up to isomorphism, are obtained in this way. For n = 1 this is the classical period lattice construction of elliptic curves. For n > 1 Bernhard Riemann found necessary and sufficient conditions for a complex torus to be an algebraic variety; those that are varieties can be embedded into complex projective space, and are the abelian varieties.

The actual projective embeddings are complicated (see equations defining abelian varieties) when n > 1, and are really coextensive with the theory of theta-functions of several complex variables (with fixed modulus). There is nothing as simple as the cubic curve description for n = 1. Computer algebra can handle cases for small n reasonably well. By Chow's theorem, no complex torus other than the abelian varieties can 'fit' into projective space.

See also

References

  • Birkenhake, Christina; Lange, Herbert (1999), Complex tori, Progress in Mathematics, 177, Boston, MA: Birkhäuser Boston, ISBN 978-0-8176-4103-0, MR 1713785
This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.