English

Notes on Short $\mathbb{C}^k$'s

Complex Variables 2021-04-27 v1 Dynamical Systems

Abstract

Domains that are increasing union of balls (up to biholomorphism) and on which the Kobayashi metric vanishes identically arise inexorably in complex analysis. In this article we show that in higher dimensions these domains have infinite volume and the Bergman spaces of these domains are trivial. As a consequence they fail to be strictly pseudo-convex at each of their boundary points although these domains are pseudo-convex by definition. These domains can be of different types and one of them is Short Ck\mathbb{C}^k's. In pursuit of identifying the Runge Short Ck\mathbb{C}^k's (up to biholomorphism), we introduce a special class of Short Ck\mathbb{C}^k's, called Loewner Short Ck\mathbb{C}^k's. These are those Short Ck\mathbb{C}^k's which can be exhausted in a continuous manner by a strictly increasing parametrized family of open sets, each of which is biholomrphically equivalent to the unit ball and therefore, they are Runge up to biholomorphism. Although, the question of whether all Short Ck\mathbb{C}^k's are Runge (up to biholomorphism), or whether all Short Ck\mathbb{C}^k's are Loewner remains unsettled, we show that the typical Short Ck\mathbb{C}^k's are Loewner. In the final section, we construct a bunch of non-autonomous basins of attraction, which serve as interesting examples of Short C2\mathbb{C}^2's.

Keywords

Cite

@article{arxiv.2104.12413,
  title  = {Notes on Short $\mathbb{C}^k$'s},
  author = {John Erik Fornaess and Ratna Pal},
  journal= {arXiv preprint arXiv:2104.12413},
  year   = {2021}
}

Comments

15 pages

R2 v1 2026-06-24T01:30:48.712Z