Proper holomorphic maps in Euclidean spaces avoiding unbounded convex sets

Abstract

We show that if E is a closed convex set in Cn (n>1) contained in a closed halfspace H such that E bH is nonempty and bounded, then the concave domain = Cn E contains images of proper holomorphic maps f:X Cn from any Stein manifold X of dimension <n, with approximation of a given map on closed compact subsets of X. If in addition 2 X+1 n then f can be chosen an embedding, and if 2 X=n then it can be chosen an immersion. Under a stronger condition on E we also obtain the interpolation property for such maps on closed complex subvarieties.