On the Calabi-Yau Conjectures for Minimal Hypersurfaces in Higher Dimensions

Abstract

In this paper, we study the Calabi-Yau conjectures for complete minimal hypersurfaces n⊂ Rn+1 in dimensions n 3. These conjectures ask whether a complete minimal hypersurface must be unbounded, and more strongly, whether it must be proper. For the unboundedness question, we prove a chord-arc estimate for an embedded minimal disk with bounded curvature, showing that intrinsic distance is controlled by a polynomial of the extrinsic distance. On the other hand, using gluing techniques, we construct a complete, improperly embedded minimal hypersurface in Rn+1 for every n 3. This example shows that the properness conjecture suggested by the deep work of Colding-Minicozzi [CM08] in the case n=2 fails in higher dimensions.