| Diagonalizability of Constraint Propagation Matrices (2002) | |||||||||
Abstract | |||||||||
| In order to obtain stable and accurate general relativistic simulations, re-formulations of the Einstein equations are necessary. In a series of our works, we have proposed using eigenvalue analysis of constraint propagation equations for evaluating violation behavior of constraints. In this article, we classify asymptotical behaviors of constraint-violation into three types (asymptotically constrained, asymptotically bounded, and diverge), and give their necessary and sufficient conditions. We find that degeneracy of eigenvalues sometimes leads constraint evolution to diverge (even if its real-part is not positive), and conclude that it is quite useful to check the diagonalizability of constraint propagation matrices. The discussion is general and can be applied to any numerical treatments of constrained dynamics.. Comment: 4 pages, RevTeX, one figure, added one paragraph in concluding remarks. The version to appear in Class. Quant. Grav. (Lett) | |||||||||
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