Irreducible components of the space of foliations by surfaces

Abstract

Let F be written as f*(G), where G is a 1-dimensional foliation on Pn-1 and f: Pn---> Pn-1 a non-linear generic rational map. We use local stability results of singular holomorphic foliations, to prove that: if n≥ 4, a foliation F by complex surfaces on Pn is globally stable under holomorphic deformations. As a consequence, we obtain irreducible components for the space of two-dimensional foliations in Pn. We present also a result which characterizes holomorphic foliations on Pn, n≥ 4 which can be obtained as a pull back of 1- foliations in Pn-1 of degree d≥2.