Non linear stability of einsteinian spacetimes with U(1) isometry group
Abstract
We prove global completeness in the expanding direction of spacetimes satisfying the vacuum Einstein equations on a manifold of the form × S1× R where is a compact surface of genus G>1. The Cauchy data are supposed to be invariant with respect to the group S1 and sufficiently small, but we do not impose a restrictive hypothesis made in gr-qc 0112049 on the lowest eigenvalue of a relevant Laplacian. The total energy decay still holds, but its rate depends of the asymptotic value of this eigenvalue.
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