English

On defining functions for unbounded pseudoconvex domains

Complex Variables 2014-08-12 v3

Abstract

We show that every strictly pseudoconvex domain Ω\Omega with smooth boundary in a complex manifold M\mathcal{M} admits a global defining function, i.e., a smooth plurisubharmonic function φ ⁣:UR\varphi \colon U \to \mathbb R defined on an open neighbourhood UMU \subset \mathcal{M} of Ω\overline{\Omega} such that Ω={φ<0}\Omega = \{\varphi < 0\}, dφ0d\varphi \neq 0 on bΩb\Omega and φ\varphi is strictly plurisubharmonic near bΩb\Omega. We then introduce the notion of the core c(Ω)\mathfrak{c}(\Omega) of an arbitrary domain ΩM\Omega \subset \mathcal{M} as the set of all points where every smooth and bounded from above plurisubharmonic function on Ω\Omega fails to be strictly plurisubharmonic. If Ω\Omega is not relatively compact in M\mathcal{M}, then in general c(Ω)\mathfrak{c}(\Omega) is nonempty, even in the case when M\mathcal{M} is Stein. It is shown that every strictly pseudoconvex domain ΩM\Omega \subset \mathcal{M} with smooth boundary admits a global defining function that is strictly plurisubharmonic precisely in the complement of c(Ω)\mathfrak{c}(\Omega). We then investigate properties of the core. Among other results we prove 1-pseudoconcavity of the core, we show that in general the core does not possess an analytic structure, and we investigate Liouville type properties of the core.

Keywords

Cite

@article{arxiv.1405.2250,
  title  = {On defining functions for unbounded pseudoconvex domains},
  author = {Tobias Harz and Nikolay Shcherbina and Giuseppe Tomassini},
  journal= {arXiv preprint arXiv:1405.2250},
  year   = {2014}
}

Comments

86 pages, Comments are welcome

R2 v1 2026-06-22T04:10:09.257Z