Prescribing metrics on the boundary of AdS 3-manifolds
Abstract
We prove that given two metrics g+ and g- with curvature <-1 on a closed, oriented surface S of genus τ≥ 2, there exists an AdS manifold N with smooth, space-like, strictly convex boundary such that the induced metrics on the two connected components of ∂ N are equal to g+ and g-. Using the duality between convex space-like surfaces in AdS3, we obtain an equivalent result about the prescription of the third fundamental form.
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