CMC-1 surfaces in hyperbolic and de Sitter spaces with Cantor ends

Abstract

We prove that on every compact Riemann surface M there is a Cantor set C ⊂ M such that M C admits a proper conformal constant mean curvature one (CMC-1) immersion into hyperbolic 3-space H3. Moreover, we obtain that every bordered Riemann surface admits an almost proper CMC-1 face into de Sitter 3-space S13, and we show that on every compact Riemann surface M there is a Cantor set C ⊂ M such that M C admits an almost proper CMC-1 face into S13. These results follow from different uniform approximation theorems for holomorphic null curves in C2 × C* that we also establish in this paper.

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