We present a new choice of initial data for binary black hole simulations that significantly improves the efficiency of high-spin simulations. We use spherical Kerr-Schild coordinates, where the horizon of a rotating black hole is spherical, for each black hole. The superposed spherical Kerr-Schild initial data reduce the runtime by a factor of 2 compared to standard superposed Kerr-Schild for an intermediate resolution spin-0.99 binary-black-hole simulation. We also explore different variations of the gauge conditions imposed during the evolution, one of which produces an additional speed-up of 1.3
The damped harmonic gauge is important for numerical relativity computations based on the generalize...
We describe early success in the evolution of binary black-hole spacetimes with a numerical code bas...
Motivated by the possibility of observing gravitational waves from merging black holes whose spins a...
We present results from a new code for binary black hole evolutions using the moving-puncture approa...
Binary black hole simulations have traditionally been computationally very expensive: current simula...
Astrophysical black holes could be nearly extremal (that is, rotating nearly as fast as possible); t...
Construction of binary black hole initial data is a prerequisite for numerical evolutions of binary ...
We solve the Hamiltonian and momentum constraints of general relativity for two black-holes with nea...
Astrophysically realistic black holes may have spins that are nearly extremal (i.e., close to 1 in ...
Initial data for numerical evolutions of binary-black holes have been dominated by “conformally flat...
We experiment with modifications of the BSSN form of the Einstein field equations (a reformulation o...
This dissertation explores numerical models of the orbit, inspiral, and merger phases of black hole ...
Accurate models of gravitational waves from merging black holes are necessary for detectors to obser...
There is a significant possibility that astrophysical black holes with nearly extremal spins exist. ...
This Letter presents a publicly available catalog of 174 numerical binary black hole simulations fol...
The damped harmonic gauge is important for numerical relativity computations based on the generalize...
We describe early success in the evolution of binary black-hole spacetimes with a numerical code bas...
Motivated by the possibility of observing gravitational waves from merging black holes whose spins a...
We present results from a new code for binary black hole evolutions using the moving-puncture approa...
Binary black hole simulations have traditionally been computationally very expensive: current simula...
Astrophysical black holes could be nearly extremal (that is, rotating nearly as fast as possible); t...
Construction of binary black hole initial data is a prerequisite for numerical evolutions of binary ...
We solve the Hamiltonian and momentum constraints of general relativity for two black-holes with nea...
Astrophysically realistic black holes may have spins that are nearly extremal (i.e., close to 1 in ...
Initial data for numerical evolutions of binary-black holes have been dominated by “conformally flat...
We experiment with modifications of the BSSN form of the Einstein field equations (a reformulation o...
This dissertation explores numerical models of the orbit, inspiral, and merger phases of black hole ...
Accurate models of gravitational waves from merging black holes are necessary for detectors to obser...
There is a significant possibility that astrophysical black holes with nearly extremal spins exist. ...
This Letter presents a publicly available catalog of 174 numerical binary black hole simulations fol...
The damped harmonic gauge is important for numerical relativity computations based on the generalize...
We describe early success in the evolution of binary black-hole spacetimes with a numerical code bas...
Motivated by the possibility of observing gravitational waves from merging black holes whose spins a...