The initial work on 3D characteristic evolution led to two independent codes, one developed at Canberra
and the other at Pittsburgh (the PITT code), both with the capability to study gravitational waves in
single black-hole spacetimes at a level not yet mastered at the time by Cauchy codes. The Pittsburgh group
established robust stability and second-order accuracy of a fully nonlinear code, which was able to calculate
the waveform at null infinity [56, 53
] and to track a dynamical black hole and excise its internal singularity
from the computational grid [141
, 139
]. The Canberra group implemented an independent
nonlinear code, which accurately evolved the exterior region of a Schwarzschild black hole. Both
codes pose data on an initial null hypersurface and on a worldtube boundary, and evolve the
exterior spacetime out to a compactified version of null infinity, where the waveform is computed.
However, there are essential differences in the underlying geometrical formalisms and numerical
techniques used in the two codes and in their success in evolving generic black-hole spacetimes.
Recently two new codes have evolved from the PITT code by introducing a new choice of spherical
coordinates [134
, 242
].
http://www.livingreviews.org/lrr-2012-2 |
Living Rev. Relativity 15, (2012), 2
![]() This work is licensed under a Creative Commons License. E-mail us: |