中文

Minimal invariant varieties and first integrals for algebraic foliations

代数几何 2007-05-23 v1

摘要

Let XX be an irreducible algebraic variety over C\mathbb{C}, endowed with an algebraic foliation F{\cal{F}}. In this paper, we introduce the notion of minimal invariant variety V(F,Y)V({\cal{F}},Y) with respect to (F,Y)({\cal{F}},Y), where YY is a subvariety of XX. If Y={x}Y=\{x\} is a smooth point where the foliation is regular, its minimal invariant variety is simply the Zariski closure of the leaf passing through xx. First we prove that for very generic xx, the varieties V(F,x)V({\cal{F}},x) have the same dimension pp. Second we generalize a result due to X. Gomez-Mont. More precisely, we prove the existence of a dominant rational map F:XZF:X\to Z, where ZZ has dimension (np)(n-p), such that for every very generic xx, the Zariski closure of F1(F(x))F^{-1}(F(x)) is one and only one minimal invariant variety of a point. We end up with an example illustrating both results.

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引用

@article{arxiv.math/0602274,
  title  = {Minimal invariant varieties and first integrals for algebraic foliations},
  author = {Philippe Bonnet},
  journal= {arXiv preprint arXiv:math/0602274},
  year   = {2007}
}

备注

15 pages