Complete densely embedded complex lines in C2

Abstract

In this paper we construct a complete injective holomorphic immersion C2 whose image is dense in C2. The analogous result is obtained for any closed complex submanifold X⊂ Cn for n>1 in place of C⊂C2. We also show that, if X intersects the unit ball Bn of Cn and K is a connected compact subset of Xn, then there is a Runge domain ⊂ X containing K which admits a complete holomorphic embedding n whose image is dense in Bn.