English

Complete hyperbolic Stein manifolds with prescribed automorphism groups

Complex Variables 2007-05-23 v1

Abstract

It is well-known that the automorphism group of a hyperbolic manifold is a Lie group.Conversely, it is interesting to see whether or not any Lie group could be prescribed asthe automorphism group of certain complex manifold. Whenthe Lie group GG is compact and connected, this problem has been completelysolved by Bedford-Dadok and independently by Saerens-Zame on 1987. Theyhave constructed \spc bounded domains Ω\Omega such that Aut(Ω)=GAut(\Omega)=G. For Bedford-Dadok's Ω,0dimCΩdimRG1\Omega, 0\le dim_{\Bbb C}\Omega- dim_{\Bbb R}G\le 1; for generic Saerens-Zame'sΩ,dimCΩdimRG\Omega,dim_{\Bbb C}\Omega \gg dim_{\Bbb R}G.J. Winkelmann has answered affirmatively to noncompact connected Liegroups in recent years. He showed there exist Stein complete hyperbolic manifolds Ω\Omega such that Aut(Ω)=GAut(\Omega)=G.In his construction, it is typical that dimCΩdimRGdim_{\Bbb C}\Omega\gg dim_{\Bbb R}G.In this article, we tackle this problem from a different aspect. We provethat for any connected Lie group GG (compact or noncompact), there exist completehyperbolic Stein manifolds Ω\Omega such that Aut(Ω)=GAut(\Omega)=G with dim\BbbCΩ=dimRG.dim_{\BbbC}\Omega=dim_{\Bbb R}G. Working on a natural complexification of the real-analyticmanifold GG, our construction of Ω\Omega is geometrically concrete andelementary in nature.

Keywords

Cite

@article{arxiv.math/0412420,
  title  = {Complete hyperbolic Stein manifolds with prescribed automorphism groups},
  author = {Su-Jen Kan},
  journal= {arXiv preprint arXiv:math/0412420},
  year   = {2007}
}

Comments

14 pages, submitted