Complete minimal surfaces with Cantor ends in minimally convex domains

Abstract

We survey the recent history of the conformal Calabi-Yau problem consisting in determining the complex structures admitted by complete bounded minimal surfaces in R3. Moreover, we prove that for any minimally convex domain in R3 and any compact Riemann surface R there is a Cantor set C in R whose complement R C is the complex structure of a complete proper minimal surface in .

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