Embedded complex curves in the affine plane

Abstract

This paper brings several contributions to the classical Forster-Bell-Narasimhan conjecture and the Yang problem concerning the existence of proper and almost proper (hence complete) injective holomorphic immersions of open Riemann surfaces in the affine plane C2 satisfying interpolation and hitting conditions. We also show that in every compact Riemann surface there is a Cantor set whose complement admits a proper holomorphic embedding in C2. The focal point is a lemma saying the following. Given a compact bordered Riemann surface, M, a closed discrete subset E of its interior M=M bM, a compact subset K⊂ M E without holes in M, and a C1 embedding f:M C2 which is holomorphic in M, we can approximate f uniformly on K by a holomorphic embedding F:M C2 which maps E bM out of a given ball and satisfies some interpolation conditions.