LOGARITHMIC FORMS AND SINGULAR PROJECTIVE FOLIATIONS

In this article we study polynomial logarithmic q-forms on a projective space and characterize those that define singular foliations of codimension q. Our main result is the algebraic proof of their infinitesimal stability when q = 2 with some extra degree assumptions. We determine new irreducible components of the moduli space of codimension two singular projective foliations of any degree, and we show that they are generically reduced in their natural scheme structure. Our method is based on an explicit description of the Zariski tangent space of the corresponding moduli space at a given generic logarithmic form. Furthermore, we lay the groundwork for an extension of our stability results to the general case q >= 2.