In mathematics, the Appell–Humbert theorem describes the line bundles on a complex torus or complex abelian variety. It was proved for 2-dimensional tori by Appell (1891) and Humbert (1893), and in general by Lefschetz (1921)
Statement
editSuppose that is a complex torus given by where is a lattice in a complex vector space . If is a Hermitian form on whose imaginary part is integral on , and is a map from to the unit circle , called a semi-character, such that
then
is a 1-cocycle of defining a line bundle on . For the trivial Hermitian form, this just reduces to a character. Note that the space of character morphisms is isomorphic with a real torus
if since any such character factors through composed with the exponential map. That is, a character is a map of the form
for some covector . The periodicity of for a linear gives the isomorphism of the character group with the real torus given above. In fact, this torus can be equipped with a complex structure, giving the dual complex torus.
Explicitly, a line bundle on may be constructed by descent from a line bundle on (which is necessarily trivial) and a descent data, namely a compatible collection of isomorphisms , one for each . Such isomorphisms may be presented as nonvanishing holomorphic functions on , and for each the expression above is a corresponding holomorphic function.
The Appell–Humbert theorem (Mumford 2008) says that every line bundle on can be constructed like this for a unique choice of and satisfying the conditions above.
Ample line bundles
editLefschetz proved that the line bundle , associated to the Hermitian form is ample if and only if is positive definite, and in this case is very ample. A consequence is that the complex torus is algebraic if and only if there is a positive definite Hermitian form whose imaginary part is integral on
See also
edit- Complex torus for a treatment of the theorem with examples
References
edit- Appell, P. (1891), "Sur les functiones périodiques de deux variables", Journal de Mathématiques Pures et Appliquées, Série IV, 7: 157–219
- Humbert, G. (1893), "Théorie générale des surfaces hyperelliptiques", Journal de Mathématiques Pures et Appliquées, Série IV, 9: 29–170, 361–475
- Lefschetz, Solomon (1921), "On Certain Numerical Invariants of Algebraic Varieties with Application to Abelian Varieties", Transactions of the American Mathematical Society, 22 (3), Providence, R.I.: American Mathematical Society: 327–406, doi:10.2307/1988897, ISSN 0002-9947, JSTOR 1988897
- Lefschetz, Solomon (1921), "On Certain Numerical Invariants of Algebraic Varieties with Application to Abelian Varieties", Transactions of the American Mathematical Society, 22 (4), Providence, R.I.: American Mathematical Society: 407–482, doi:10.2307/1988964, ISSN 0002-9947, JSTOR 1988964
- Mumford, David (2008) [1970], Abelian varieties, Tata Institute of Fundamental Research Studies in Mathematics, vol. 5, Providence, R.I.: American Mathematical Society, ISBN 978-81-85931-86-9, MR 0282985, OCLC 138290