Algebraic integrability of planar polynomial vector fields by extension to Hirzebruch surfaces

Abstract

We study algebraic integrability of complex planar polynomial vector fields X=A (x,y)(∂/∂ x) + B(x,y) (∂/∂ y) through extensions to Hirzebruch surfaces. Using these extensions, each vector field X determines two infinite families of planar vector fields that depend on a natural parameter which, when X has a rational first integral, satisfy strong properties about the dicriticity of the points at the line x=0 and of the origin. As a consequence, we obtain new necessary conditions for algebraic integrability of planar vector fields and, if X has a rational first integral, we provide a region in R≥ 02 that contains all the pairs (i,j) corresponding to monomials xi yj involved in the generic invariant curve of X.