Higher codimensional foliations and Kupka singularities

Abstract

We consider holomorphic foliations of dimension k>1 and codimension ≥ 1 in the projective space Pn, with a compact connected component of the Kupka set. We prove that, if the transversal type is linear with positive integers eigenvalues, then the foliation consist on the fibers of a rational fibration. As a corollary, if F is a foliation such that dim(F)≥ cod(F)+2 and has transversal type diagonal with different eigenvalues, then the Kupka component K is a complete intersection and we get the same conclusion. The same conclusion holds if the Kupka set is a complete intersection and has radial transversal type. Finally, as an application, we find a normal form for non integrable codimension one distributions on Pn.