Let X be a (possibly singular) subvariety of a complex manifold M and Y a subvariety of X. We assume that Y is the intersection locus of X with a submanifold P subset of M and that this intersection is generically transversal. For such a pair (X, Y), we prove a generalization of the classical Camacho-Sad residue theorem, in case there exists a holomorphic foliation F of X leaving Y invariant. Also, we compute explicitly the residues at isolated singular points.
Residues for holomorphic foliations of singular pairs / BRACCI F; T. SUWA. - In: ADVANCES IN GEOMETRY. - ISSN 1615-715X. - STAMPA. - 5:(2005), pp. 81-95. [10.1515/advg.2005.5.1.81]
Residues for holomorphic foliations of singular pairs
BRACCI F;
2005
Abstract
Let X be a (possibly singular) subvariety of a complex manifold M and Y a subvariety of X. We assume that Y is the intersection locus of X with a submanifold P subset of M and that this intersection is generically transversal. For such a pair (X, Y), we prove a generalization of the classical Camacho-Sad residue theorem, in case there exists a holomorphic foliation F of X leaving Y invariant. Also, we compute explicitly the residues at isolated singular points.
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