A criterion for the holomorphy of the curvature of smooth planar webs and applications to dual webs of homogeneous foliations on P2C

Abstract

Let d≥3 be an integer. For a holomorphic d-web W on a complex surface M, smooth along an irreducible component D of its discriminant (W), we establish an effective criterion for the holomorphy of the curvature of W along D, generalizing results on decomposable webs due to Mar\'n, Pereira and Pirio. As an application, we deduce a complete characterization for the holomorphy of the curvature of the Legendre transform (dual web) LegH of a homogeneous foliation H of degree d on P2C, generalizing some of our previous results. This then allows us to study the flatness of the d-web LegH in the particular case where the foliation H is Galois. When the Galois group of H is cyclic, we show that LegH is flat if and only if H is given, up to linear conjugation, by one of the two 1-forms ω10.2mmd=yddx-xddy, ω20.2mmd=xddx-yddy. When the Galois group of H is non-cyclic, we obtain that LegH is always flat.