In mathematics, the Castelnuovo–de Franchis theorem is a classical result on complex algebraic surfaces. Let X be such a surface, projective and non-singular, and let
- ω1 and ω2
be two differentials of the first kind on X which are linearly independent but with wedge product 0. Then this data can be represented as a pullback of an algebraic curve: there is a non-singular algebraic curve C, a morphism
- φ: X → C,
and differentials of the first kind ω′1 and ω′2 on C such that
- φ*(ω′1) = ω1 and φ*(ω′2) = ω2.
This result is due to Guido Castelnuovo and Michele de Franchis (1875–1946).
The converse, that two such pullbacks would have wedge 0, is immediate.
See also
editReferences
edit- Coen, S. (1991), Geometry and Complex Variables, Lecture Notes in Pure and Applied Mathematics, vol. 132, CRC Press, p. 68, ISBN 9780824784454.
- Catanese, Fabrizio (1991). "Moduli and classification of irregular Kaehler manifolds (And algebraic varieties) with Albanese general type fibrations". Inventiones Mathematicae. 104 (2): 263–290. doi:10.1007/BF01245076. S2CID 122748633.