English

The Poincar\'e Problem for a foliated surface

Algebraic Geometry 2024-10-08 v2

Abstract

Let F\mathcal F be a foliation on a smooth projective surface SS over the complex number C\mathbb{C}. We introduce three birational non-negative invariants c12(F)c_1^2(\mathcal F), c2(F)c_2(\mathcal F) and χ(F)\chi(\mathcal F), called the Chern numbers. If the foliation F\mathcal F is not of general type, the first Chern number c12(F)=0c_1^2(\mathcal F)=0, and c2(F)=χ(F)=0c_2(\mathcal F)=\chi(\mathcal F)=0 except when F\mathcal F is induced by a non-isotrivial fibration of genus g=1g=1. If F\mathcal F is of general type, we obtain a slope inequality when F\mathcal F is algebraically integral. As a corollary, F\mathcal F is always transcendental if the slope is less than 22. On the other hand, we also prove three sharp Noether type inequalities if F\mathcal F is of general type. As applications, we obtain a criterion for foliations to be transcendental using Noether type inequalities, and we also give a partial positive answer to the question on the lower bound on the volume of a foliation of general type.

Keywords

Cite

@article{arxiv.2404.16293,
  title  = {The Poincar\'e Problem for a foliated surface},
  author = {Xin Lü and Shengli Tan},
  journal= {arXiv preprint arXiv:2404.16293},
  year   = {2024}
}

Comments

The title is changed and one more author is added. In this new version, we provide two approaches to study the Poincare's problem on the algebraic integrability of foliations on smooth surfaces: the first one is to use the Chern numbers and slope inequalities; the other one is to use the Noether type inequalities obtained in the earlier version.of this paper. Any comment is warmly welcome

R2 v1 2026-06-28T16:05:45.225Z