The Calabi-Yau problem for Riemann surfaces with finite genus and countably many ends

Abstract

In this paper, we show that if R is a compact Riemann surface and M=R\,i Di is a domain in R whose complement is a union of countably many pairwise disjoint smoothly bounded closed discs Di, then M is the complex structure of a complete bounded minimal surface in R3. We prove that there is a complete conformal minimal immersion X:M R3 extending to a continuous map X: M R3 such that X(bM)=i X(bDi) is a union of pairwise disjoint Jordan curves. This extends a recent result for bordered Riemann surfaces.