Resumo: Let X be a smooth complex projective manifold of dimension n. A holomorphic distribution F of codimension k on X is nonzero coherent subsheaf TF ⫋ TX of generic rank n − k which saturated, i.e, such that TX /TF is torsion free. In this lecture, we will present the study of non integrable codimension one special holomorphic distribution F on the complex projective three-space along a smooth irreducible curve C ⊂ Sing(F). We determine a upper bound for the residue of F along C and also the special distributions through its singular scheme. This is a joint work with Gilcione Nonato (UFMG) and Arturo Fernández (UFMG).