Qian Wang
Published 2011-12-30Version 1
In this paper, we consider very rough solutions to Cauchy problem for the Einstein vacuum equations in CMC spacial harmonic gauge, and obtain the local well-posedness result in $H^s, s>2$. The novelty of our approach lies in that, without resorting to the standard paradifferential regularization over the rough, Einstein metric $\bg$, we manage to implement the commuting vector field approach to prove Strichartz estimate for geometric wave equation $\Box_\bg \phi=0$ directly.
Improved breakdown criterion for Einstein vacuum equations in CMC gauge
Naked Singularities for the Einstein Vacuum Equations: The Exterior Solution
Radiation field for Einstein vacuum equations with spacial dimension $n\geq 4$
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