A half-space theorem for ideal Scherk graphs in M× R
Abstract
We prove a half-space theorem for an ideal Scherk graph ⊂ M× R over a polygonal domain D⊂ M, where M is a Hadamard surface whose curvature is bounded above by a negative constant. More precisely, we show that a properly immersed minimal surface contained in D× R and disjoint from is a translate of .
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