English

Partial separatrices and local Brunella's alternative

Dynamical Systems 2014-11-27 v1 Complex Variables

Abstract

Here we state a conjecture concerning a local version of Brunella's alternative: any codimension one foliation in (C3,0)({\mathbb C}^3,0) without germ of invariant surface has a neighborhood of the origin formed by leaves containing a germ of analytic curve at the origin. We prove the conjecture for the class of codimension one foliations whose reduction of singularities is obtained by blowing-up points and curves of equireduction and such that the final singularities are free of saddle-nodes. The concept of "partial separatrix" for a given reduction of singularities has a central role in our argumentations, as well as the quantitative control of the generic Camacho-Sad index in dimension three. The "nodal components" are the only possible obstructions to get such germs of analytic curves. We use the partial separatrices to push the leaves near a nodal component towards compact diacritical divisors, finding in this way the desired analytic curves.

Keywords

Cite

@article{arxiv.1411.7349,
  title  = {Partial separatrices and local Brunella's alternative},
  author = {Felipe Cano and Marianna Ravara-Vago},
  journal= {arXiv preprint arXiv:1411.7349},
  year   = {2014}
}
R2 v1 2026-06-22T07:13:37.103Z