NON KÄHLERIAN SURFACES WITH A CYCLE OF RATIONAL CURVES
Résumé
Abstract. Let S be a compact complex surface in class VII^+0 containing a cycle of rational curves C = \sum Dj . Let D = C + A be the maximal connected divisor containing C. If there is another connected component of curves C′ then C′ is a cycle of rational curves, A = 0 and S is a Inoue-Hirzebruch surface. If there is only one connected component D then each connected component Ai of A is a chain of rational curves which intersects a curve Cj of the cycle and for each curve Cj of the cycle there at most one chain which meets Cj . In other words, we do not prove the existence of curves other those of the cycle C, but if some other curves exist the maximal divisor looks like the maximal divisor of a Kato surface with perhaps missing curves. The proof of this topological result is an application of Donaldson theorem on trivialization of the intersection form and of deformation theory. We apply this result to show that a twisted logarithmic 1-form has a trivial vanishing divisor.
Domaines
Variables complexes [math.CV]
Origine : Fichiers produits par l'(les) auteur(s)