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Integrable Osculating Plane Distributions

Gilcione Nonato Costa — 2013

Annales de la faculté des sciences de Toulouse Mathématiques

We give a necessary condition for a holomorphic vector field to induce an integrable osculating plane distribution and, using this condition, we give a characterization of such fields. We also give a generic classification for vector fields which have two invariant coordinate planes.

Holomorphic foliations by curves on 3 with non-isolated singularities

Gilcione Nonato Costa — 2006

Annales de la faculté des sciences de Toulouse Mathématiques

Let be a holomorphic foliation by curves on 3 . We treat the case where the set Sing ( ) consists of disjoint regular curves and some isolated points outside of them. In this situation, using Baum-Bott’s formula and Porteuos’theorem, we determine the number of isolated singularities, counted with multiplicities, in terms of the degree of , the multiplicity of along the curves and the degree and genus of the curves.

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