The Prescribed Metric on Convex Subsets of Anti-de Sitter Space with Quasi-Circle Ideal Boundaries
Abstract
Let h+ and h- be two complete, conformal metrics on the disc D. Assume moreover that the derivatives of the conformal factors of the metrics h+ and h- are bounded at any order with respect to the hyperbolic metric, and that the metrics have curvatures in the interval (-1ε, -1 - ε), for some ε > 0. Let f be a quasi-symmetric map. We show the existence of a globally hyperbolic convex subset (see Definition 4.1) of the three-dimensional anti-de Sitter space, such that has h+ (respectively h-) as the induced metric on its future boundary (respectively on its past boundary) and has a gluing map (see Definition 5.7) equal to f.
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