A long C2 without holomorphic functions

Abstract

In this paper we construct for every integer n>1 a complex manifold of dimension n which is exhausted by an increasing sequence of biholomorphic images of Cn (i.e., a long Cn), but it does not admit any nonconstant holomorphic or plurisubharmonic functions. Furthermore, we introduce new biholomorphic invariants of a complex manifold X, 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 X. We show that every compact polynomially convex set B⊂ Cn which is the closure of its interior is the strongly stable core of a long Cn; in particular, biholomorphically nonequivalent sets give rise to nonequivalent long Cn's. Furthermore, for any open set U⊂ Cn there exists a long Cn whose stable core is dense in U. It follows that for any n>1 there is a continuum of pairwise nonequivalent long Cn's with no nonconstant plurisubharmonic functions and no nontrivial holomorphic automorphisms. These results answer several long standing open problems.