Improved outer boundary conditions for Einstein's field equations
Abstract
In a recent article, we constructed a hierarchy B_L of outer boundary conditions for Einstein's field equations with the property that, for a spherical outer boundary, it is perfectly absorbing for linearized gravitational radiation up to a given angular momentum number L. In this article, we generalize B_2 so that it can be applied to fairly general foliations of spacetime by space-like hypersurfaces and general outer boundary shapes and further, we improve B_2 in two steps: (i) we give a local boundary condition C_2 which is perfectly absorbing including first order contributions in 2M/R of curvature corrections for quadrupolar waves (where M is the mass of the spacetime and R is a typical radius of the outer boundary) and which significantly reduces spurious reflections due to backscatter, and (ii) we give a non-local boundary condition D_2 which is exact when first order corrections in 2M/R for both curvature and backscatter are considered, for quadrupolar radiation.
Cite
@article{arxiv.gr-qc/0703129,
title = {Improved outer boundary conditions for Einstein's field equations},
author = {Luisa T. Buchman and Olivier C. A. Sarbach},
journal= {arXiv preprint arXiv:gr-qc/0703129},
year = {2008}
}
Comments
accepted Class. Quant. Grav. numerical relativity special issue; 17 pages and 1 figure