Classification of foliations of degree three on P2C with a flat Legendre transform

Abstract

The set F(3) of foliations of degree three on the complex projective plane can be identified with a Zariski's open set of a projective space of dimension 23 on which acts Aut(P2C). The subset FP(3) of F(3) consisting of foliations of F(3) with a flat Legendre transform (dual web) is a Zariski closed subset of F(3). We classify up to automorphism of P2C the elements of FP(3). More precisely, we show that up to automorphism there are 16 foliations of degree three with a flat Legendre transform. From this classification we deduce that FP(3) has exactly 12 irreducible components. We also deduce that up to automorphism there are 4 convex foliations of degree three on P2C.