Constant mean curvature foliations of flat space--times

Abstract

Let V be a maximal globally hyperbolic flat n+1--dimensional space--time with compact Cauchy surface of hyperbolic type. We prove that V is globally foliated by constant mean curvature hypersurfaces Mτ, with mean curvature τ taking all values in (-∞, 0). For n ≥ 3, define the rescaled volume of Mτ by = |τ|n (M,g), where g is the induced metric. Then ≥ nn (M,g0) where g0 is the hyperbolic metric on M with sectional curvature -1. Equality holds if and only if (M,g) is isometric to (M,g0).

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