Towards absorbing outer boundaries in General Relativity

TL;DR

This paper develops and analyzes boundary conditions for gravitational wave simulations, demonstrating how to minimize artificial reflections and improve accuracy in numerical relativity on finite domains.

Contribution

It introduces new constraint-preserving boundary conditions that effectively absorb gravitational radiation and reduces artificial reflections in linearized gravity simulations.

Findings

Reflection coefficient decays as 1/(kR)^4 for large kR.

New boundary conditions reduce reflection by a factor of M/R compared to previous methods.

Explicit solutions show freezing Psi_0 is incompatible with constraints.

Abstract

We construct exact solutions to the Bianchi equations on a flat spacetime background. When the constraints are satisfied, these solutions represent in- and outgoing linearized gravitational radiation. We then consider the Bianchi equations on a subset of flat spacetime of the form [0,T] x B_R, where B_R is a ball of radius R, and analyze different kinds of boundary conditions on \partial B_R. Our main results are: i) We give an explicit analytic example showing that boundary conditions obtained from freezing the incoming characteristic fields to their initial values are not compatible with the constraints. ii) With the help of the exact solutions constructed, we determine the amount of artificial reflection of gravitational radiation from constraint-preserving boundary conditions which freeze the Weyl scalar Psi_0 to its initial value. For monochromatic radiation with wave number k and arbitrary angular momentum number l >= 2, the amount of reflection decays as 1/(kR)^4 for large kR. iii) For each L >= 2, we construct new local constraint-preserving boundary conditions which perfectly absorb linearized radiation with l <= L. (iv) We generalize our analysis to a weakly curved background of mass M, and compute first order corrections in M/R to the reflection coefficients for quadrupolar odd-parity radiation. For our new boundary condition with L=2, the reflection coefficient is smaller than the one for the freezing Psi_0 boundary condition by a factor of M/R for kR > 1.04. Implications of these results for numerical simulations of binary black holes on finite domains are discussed.