Embedded convex surfaces in hyperbolic and anti-de Sitter spaces

Abstract

We show that given a quasi-circle C ⊂ ∂∞ H3 (respectively C ⊂ ∂∞ ADS3) and a complete conformal metric h on D whose curvature Kh takes values in a compact subset of (-1,0) (respectively (-∞,-1)), with all derivatives bounded with respect to the hyperbolic metric, there exists a smooth isometric embedding V : (D,h) H3 (respectively V : (D,h) ADS3) such that V extends continuously to a homeomorphism ∂ V : S1 C. In the hyperbolic case, the conclusion still holds if C is an arbitrary Jordan curve.

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