C*- Actions on Stein analytic spaces with isolated singularities

Abstract

Let V be an irreducible complex analytic space of dimension two with normal singularities and :C*× V V a holomorphic action of the group C* on V. Denote by the foliation on V induced by . The leaves of this foliation are the one-dimensional orbits of . %and its singularities are the fixed points of . We will assume that there exists a dicritical singularity p∈ V for the *-action, i.e. for some neighborhood p∈ W⊂ V there are infinitely many leaves of F|W accumulating only at p. The closure of such a local leaf is an invariant local analytic curve called a separatrix of F through p. In Orlik Orlik and Wagreich studied the 2-dimensional affine algebraic varieties embedded in Cn+1, with an isolated singularity at the origin, that are invariant by an effective action of the form σQ(t,(z0,...,zn))=(tq0z0,..., tqnzn) where Q=(q0,...,qn) ∈ Nn+1, i.e. all qi are positive integers. Such actions are called good actions. In particular they classified the algebraic surfaces embedded in C3 endowed with such an action. It is easy to see that any good action on a surface embedded in Cn+1 has a dicritical singularity at 0∈Cn+1. Conversely, it is the purpose of this paper to show that good actions are the models for analytic C*-actions on Stein analytic spaces of dimension two with a dicritical singularity.