Constraint-preserving boundary treatment for a harmonic formulation of
  the Einstein equations

Alcubierre M; Alcubierre M; Arnowitt R; Babiuc M C; Buchman L T; Béla Szilágyi; Calabrese G; Calabrese G; Denis Pollney; Eppley K R; Gundlach C; Holz D Miller W Wakano M Wheeler J Hu B L Jacobson T A; Jennifer Seiler; Kreiss H O; Kreiss H O; Kreiss H O; Lindblom L; Luciano Rezzolla; Pazos E; Reula O; Rinne O; Rinne O; Szilagyi B

research

Constraint-preserving boundary treatment for a harmonic formulation of the Einstein equations

Authors: Alcubierre M
Alcubierre M
Arnowitt R
Babiuc M C
Buchman L T
Béla Szilágyi
Calabrese G
Calabrese G
Denis Pollney
Eppley K R
Gundlach C
Holz D Miller W Wakano M Wheeler J Hu B L Jacobson T A
Jennifer Seiler
Kreiss H O
Kreiss H O
Kreiss H O
Lindblom L
Luciano Rezzolla
Pazos E
Reula O
Rinne O
Rinne O
Szilagyi B
Publication date: 1 January 2008
Publisher: 'IOP Publishing'
Doi

Abstract

We present a set of well-posed constraint-preserving boundary conditions for a first-order in time, second-order in space, harmonic formulation of the Einstein equations. The boundary conditions are tested using robust stability, linear and nonlinear waves, and are found to be both less reflective and constraint preserving than standard Sommerfeld-type boundary conditions.Comment: 18 pages, 7 figures, accepted in CQ