The bulk-boundary correspondence for the Einstein equations in asymptotically Anti-de Sitter spacetimes
Abstract
In this paper, we consider vacuum asymptotically anti-de Sitter spacetimes ( M, g ) with conformal boundary ( I, g ). We establish a correspondence, near I, between such spacetimes and their conformal boundary data on I. More specifically, given a domain D ⊂ I, we prove that the coefficients g(0) = g and g(n) (the undetermined term or stress energy tensor) in a Fefferman-Graham expansion of the metric g from the boundary uniquely determine g near D, provided D satisfies a generalised null convexity condition (GNCC). The GNCC is a conformally invariant criterion on D, first identified by Chatzikaleas and the second author, that ensures a foliation of pseudoconvex hypersurfaces in M near D, and with the pseudoconvexity degenerating in the limit at D. As a corollary of this result, we deduce that conformal symmetries of ( g(0), g(n) ) on domains D ⊂ I satisfying the GNCC extend to spacetimes symmetries near D. The proof, which does not require any analyticity assumptions, relies on three key ingredients: (1) a calculus of vertical tensor-fields developed for this setting; (2) a novel system of transport and wave equations for differences of metric and curvature quantities; and (3) recently established Carleman estimates for tensorial wave equations near the conformal boundary.
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