English

C^*- Actions on Stein analytic spaces with isolated singularities

Complex Variables 2007-09-06 v1 Dynamical Systems

Abstract

Let VV be an irreducible complex analytic space of dimension two with normal singularities and \vr:C×VV\vr:\mathbb{C^*}\times V\to V a holomorphic action of the group C\mathbb{C^*} on VV. Denote by \fa\vr\fa_\vr the foliation on VV induced by \vr\vr. The leaves of this foliation are the one-dimensional orbits of \vr\vr. %and its singularities are the fixed points of \vr\vr. We will assume that there exists a \emph{dicritical} singularity pVp\in V for the \bc\bc^*-action, i.e. for some neighborhood pWVp\in W\subset V there are infinitely many leaves of F\vrW\mathcal {F}_\vr|_{W} accumulating only at pp. The closure of such a local leaf is an invariant local analytic curve called a \emph{separatrix} of F\vr\mathcal{F}_\vr through pp. In \cite{Orlik} Orlik and Wagreich studied the 2-dimensional affine algebraic varieties embedded in Cn+1\mathbb{C}^{n+1}, with an isolated singularity at the origin, that are invariant by an effective action of the form σQ(t,(z0,...,zn))=(tq0z0,...,tqnzn)\sigma_Q(t,(z_{0},...,z_{n}))=(t^{q_{0}}z_{0},..., t^{q_{n}}z_{n}) where Q=(q0,...,qn)Nn+1Q=(q_0,...,q_n) \in\mathbb N^{n+1}, i.e. all qiq_{i} are positive integers. Such actions are called \emph{good} actions. In particular they classified the algebraic surfaces embedded in C3\mathbb{C}^{3} endowed with such an action. It is easy to see that any good action on a surface embedded in Cn+1\mathbb{C}^{n+1} has a dicritical singularity at 0Cn+10\in\mathbb{C}^{n+1}. Conversely, it is the purpose of this paper to show that good actions are the models for analytic C\mathbb{C^*}-actions on Stein analytic spaces of dimension two with a dicritical singularity.

Keywords

Cite

@article{arxiv.0709.0547,
  title  = {C^*- Actions on Stein analytic spaces with isolated singularities},
  author = {Cesar Camacho and Hossein Movasati and Bruno Scardua},
  journal= {arXiv preprint arXiv:0709.0547},
  year   = {2007}
}
R2 v1 2026-06-21T09:13:56.661Z