Einstein's Equations and Equivalent Hyperbolic Dynamical Systems
摘要
We discuss several explicitly causal hyperbolic formulations of Einstein's dynamical 3+1 equations in a coherent way, emphasizing throughout the fundamental role of the ``slicing function,'' ---the quantity that relates the lapse to the determinant of the spatial metric through . The slicing function allows us to demonstrate explicitly that every foliation of spacetime by spatial time-slices can be used in conjunction with the causal hyperbolic forms of the dynamical Einstein equations. Specifically, the slicing function plays an essential role (1) in a clearer form of the canonical action principle and Hamiltonian dynamics for gravity and leads to a recasting (2) of the Bianchi identities as a well-posed system for the evolution of the gravitational constraints in vacuum, and also (3) of as a well-posed system for evolution of the energy and momentum components of the stress tensor in the presence of matter, (4) in an explicit rendering of four hyperbolic formulations of Einstein's equations with only physical characteristics, and (5) in providing guidance to a new ``conformal thin sandwich'' form of the initial value constraints.
引用
@article{arxiv.gr-qc/9907099,
title = {Einstein's Equations and Equivalent Hyperbolic Dynamical Systems},
author = {Arlen Anderson and Yvonne Choquet-Bruhat and James W. York},
journal= {arXiv preprint arXiv:gr-qc/9907099},
year = {2007}
}
备注
30 pages, LaTeX2e, to be published in the Proceedings of the 2nd Samos Meeting. (Errors in previous version corrected)