A construction of complete complex hypersurfaces in the ball with control on the topology

Abstract

Given a closed complex hypersurface Z⊂ CN+1 (N∈N) and a compact subset K⊂ Z, we prove the existence of a pseudoconvex Runge domain D in Z such that K⊂ D and there is a complete proper holomorphic embedding from D into the unit ball of CN+1. For N=1, we derive the existence of complete properly embedded complex curves in the unit ball of C2, with arbitrarily prescribed finite topology. In particular, there exist complete proper holomorphic embeddings of the unit disc D⊂ C into the unit ball of C2. These are the first known examples of complete bounded embedded complex hypersurfaces in CN+1 with any control on the topology.