Geometrical Well Posed Systems for the Einstein Equations

Abstract

We show that, given an arbitrary shift, the lapse N can be chosen so that the extrinsic curvature K of the space slices with metric g in arbitrary coordinates of a solution of Einstein's equations satisfies a quasi-linear wave equation. We give a geometric first order symmetric hyperbolic system verified in vacuum by g, K and N. We show that one can also obtain a quasi-linear wave equation for K by requiring N to satisfy at each time an elliptic equation which fixes the value of the mean extrinsic curvature of the space slices.

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