Abstract
Let S be a compact, orientable surface of hyperbolic type. Let \((k_+,k_-)\) be a pair of negative numbers and let \((g_+, g_-)\) be a pair of marked metrics over S of constant curvature equal to \(k_+\) and \(k_-\) respectively. Using a functional introduced by Bonsante, Mondello and Schlenker, we show that there exists a unique affine deformation \(\Gamma :=(\rho ,\tau )\) of a Fuchsian group such that \((S,g_+)\) and \((S, g_-)\) embed isometrically as locally strictly convex Cauchy surfaces in the future and past complete components respectively of the quotient by \(\Gamma \) of an open subset \(\Omega \) of Minkowski space. Such quotients are known as Globally Hyperbolic, Maximal, Cauchy compact Minkowski spacetimes and are naturally dual to the half-pipe spaces introduced by Danciger. When translated into this latter framework, our result states that there exists a unique, marked, quasi-Fuchsian half-pipe space in which \((S, g_+)\) and \((S, g_-)\) are realised as the third fundamental forms of future- and past-oriented, locally strictly convex graphs.
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Fillastre, F., Smith, G. A note on invariant constant curvature immersions in Minkowski space. Geom Dedicata 206, 75–82 (2020). https://doi.org/10.1007/s10711-019-00477-7
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DOI: https://doi.org/10.1007/s10711-019-00477-7