Darboux integrable system with a triple point and pseudo-abelian integrals

Abstract

In this paper we consider the degeneracies of the third type. More exact, the perturbations of the Darboux integrable foliation with a triple point, i.e. the case where three of the curves \Pi = 0\ meet at one point, are considered. Assuming that this is the only non-genericity, we prove that the number of zeros of the corresponding pseudo-abelian integrals is bounded uniformly for close Darboux integrable foliations. Let F denote the foliation with triple point (assume it to be at the origin), and let Fλ = \Mλ dHλ Hλ = 0\, Mλ is a integrating factor, be the close foliation. The main problem is that Fλ can have a small nest of cycles which shrinks to the origin as λ 0. A particular case of this situation, namely Hλ = (x -λ)ε (y - x)ε+ (y + x)ε- with non-vanishing at the origin (and generic in appropriate sense).