The Weyl problem for unbounded convex domains in 3

Abstract

Let K⊂ 3 be a convex subset in 3 with smooth, strictly convex boundary. The induced metric on ∂ K then has curvature K>-1. It was proved by Alexandrov that if K is bounded, then it is uniquely determined by the induced metric on the boundary, and any smooth metric with curvature K>-1 can be obtained. We propose here an extension of the existence part of this result to unbounded convex domains in 3. The induced metric on ∂ K is then clearly not sufficient to determine K. However one can consider a richer data on the boundary including the ideal boundary of K. Specifically, we consider the data composed of the full conformal structure on the boundary of K (in the Poincar\'e model of 3), together with the induced metric on ∂ K. We show that a wide range of "reasonable" data of this type, satisfying mild curvature conditions, can be realized on the boundary of a convex subset in 3.

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