On the connectedness of the singular set of holomorphic foliations

Abstract

Let F be a singular holomorphic foliation of dimension k>1 on a projective n-manifold X. Assume that the determinant of the normal sheaf of F is ample (as is always the case when X=Pn), and that the singular set Sing(F) has dimension ≤ k-1. We show that the union of those irreducible components of Sing(F) of dimension exactly k-1 is necessarily connected. Consequently, we obtain a Bott-type topological obstruction to the integrability of singular holomorphic distributions, echoing Bott's vanishing theorem, and we answer a question of Cerveau for codimension-one foliations on P3.