A long $\mathbb C^2$ without holomorphic functions
Abstract
In this paper we construct for every integer a complex manifold of dimension which is exhausted by an increasing sequence of biholomorphic images of (i.e., a long ), but it does not admit any nonconstant holomorphic or plurisubharmonic functions. Furthermore, we introduce new biholomorphic invariants of a complex manifold , the stable core and the strongly stable core, that are based on the long term behavior of hulls of compact sets with respect to an exhaustion of . We show that every compact polynomially convex set which is the closure of its interior is the strongly stable core of a long ; in particular, biholomorphically nonequivalent sets give rise to nonequivalent long 's. Furthermore, for any open set there exists a long whose stable core is dense in . It follows that for any there is a continuum of pairwise nonequivalent long 's with no nonconstant plurisubharmonic functions and no nontrivial holomorphic automorphisms. These results answer several long standing open problems.
Keywords
Cite
@article{arxiv.1511.05075,
title = {A long $\mathbb C^2$ without holomorphic functions},
author = {Luka Boc Thaler and Franc Forstneric},
journal= {arXiv preprint arXiv:1511.05075},
year = {2017}
}
Comments
To appear in Analysis & PDE