Mean curvature flow in asymptotically flat product spacetimes
Abstract
We consider the long-time behaviour of the mean curvature flow of spacelike hypersurfaces in the Lorentzian product manifold M×R, where M is asymptotically flat. If the initial hypersurface F0⊂ M×R is uniformly spacelike and asymptotic to M×\s\ for some s∈R at infinity, we show that a mean curvature flow starting at F0 exists for all times and converges uniformly to M×\s\ as t ∞.
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