Effective Integrability of Lins Neto's Family of Foliations

Abstract

A. Lins Neto presented in [Lins-Neto,2002] a 1-dimensional family of degree four foliations on the complex projective plane Ft ∈ C with non-degenerate singularities of fixed analytic type, whose set of parameters t for which Ft is an elliptic pencil is dense and countable. In [McQuillan,2001] and [Guillot,2002], M. McQuillan and A. Guillot showed that the family lifts to linear foliations on the abelian surface E × E, where E = C/, = < 1 , τ> and τ is a primitive 3rd root of unity, the parameters for which Ft are elliptic pencils being t∈ Q(τ) ∞. In [Puchuri,2013], the second author gave a closed formula for the degree of the elliptic curves of Ft a function of t ∈ Q(τ). In this work we determine degree, positions and multiplicities of singularities of the elliptic curves of Ft, for any given t ∈ Z(τ) in algorithmical way implemented in Python. And also we obtain the explicit expressions for the generators of the elliptic pencils, using the Singular software. Our constructions depend on the effect of quadratic Cremona maps on the family of foliations Ft.