Holomorphic maps with large images

Abstract

We show that each pseudoconvex domain ⊂ Cn admits a holomorphic map F to Cm with |F| C1 eC2 δ-6, where δ is the minimum of the boundary distance and (1+|z|2)-1/2, such that every boundary point is a Casorati-Weierstrass point of F. Based on this fact, we introduce a new anti-hyperbolic concept --- universal dominability. We also show that for each α>6 and each pseudoconvex domain ⊂ Cn, there is a holomorphic function f on with |f| Cα eCα' δ-α, such that every boundary point is a Picard point of F. Applications to the construction of holomorphic maps of a given domain onto some Cm are given.