Mathematics – Algebraic Geometry
Scientific paper
2006-02-13
Mathematics
Algebraic Geometry
15 pages
Scientific paper
Let $X$ be an irreducible algebraic variety over $\mathbb{C}$, endowed with an algebraic foliation ${\cal{F}}$. In this paper, we introduce the notion of minimal invariant variety $V({\cal{F}},Y)$ with respect to $({\cal{F}},Y)$, where $Y$ is a subvariety of $X$. If $Y=\{x\}$ is a smooth point where the foliation is regular, its minimal invariant variety is simply the Zariski closure of the leaf passing through $x$. First we prove that for very generic $x$, the varieties $V({\cal{F}},x)$ have the same dimension $p$. Second we generalize a result due to X. Gomez-Mont. More precisely, we prove the existence of a dominant rational map $F:X\to Z$, where $Z$ has dimension $(n-p)$, such that for every very generic $x$, the Zariski closure of $F^{-1}(F(x))$ is one and only one minimal invariant variety of a point. We end up with an example illustrating both results.
No associations
LandOfFree
Minimal invariant varieties and first integrals for algebraic foliations does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.
If you have personal experience with Minimal invariant varieties and first integrals for algebraic foliations, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Minimal invariant varieties and first integrals for algebraic foliations will most certainly appreciate the feedback.
Profile ID: LFWR-SCP-O-167294