Rotating black hole orbit functionals in the frequency domain

Drasco, Steve; Hughes, Scott A.

doi:10.1103/physrevd.69.044015

Cited by 130 publications

(248 citation statements)

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“…[30] for detailed discussion. The function J ⋆ lmω (r o , θ o ) gathers all the pieces of the integrand for Z ⋆ lmω that can be described as harmonics of Υ θ and Υ r .…”

Section: A the Frequency-domain Teukolsky Equation And Its Solutionsmentioning

confidence: 99%

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Resonantly enhanced and diminished strong-field gravitational-wave fluxes

Flanagan

Hughes

Ruangsri³

2014

Phys. Rev. D

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113

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The inspiral of a stellar mass (1 − 100 M⊙) compact body into a massive (10 5 − 10 7 M⊙) black hole has been a focus of much effort, both for the promise of such systems as astrophysical sources of gravitational waves, and because they are a clean limit of the general relativistic two-body problem. Our understanding of this problem has advanced significantly in recent years, with much progress in modeling the "self force" arising from the small body's interaction with its own spacetime deformation. Recent work has shown that this self interaction is especially interesting when the frequencies associated with the orbit's θ and r motions are in an integer ratio: Ω θ /Ωr = β θ /βr, with β θ and βr both integers. In this paper, we show that key aspects of the self interaction for such "resonant" orbits can be understood with a relatively simple Teukolsky-equation-based calculation of gravitational-wave fluxes. We show that fluxes from resonant orbits depend on the relative phase of radial and angular motions. The purpose of this paper is to illustrate in simple terms how this phase dependence arises using tools that are good for strong-field orbits, and to present a first study of how strongly the fluxes vary as a function of this phase and other orbital parameters. Future work will use the full dissipative self force to examine resonant and near resonant strong-field effects in greater depth, which will be needed to characterize how a binary evolves through orbital resonances.

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“…[30] for detailed discussion. The function J ⋆ lmω (r o , θ o ) gathers all the pieces of the integrand for Z ⋆ lmω that can be described as harmonics of Υ θ and Υ r .…”

Section: A the Frequency-domain Teukolsky Equation And Its Solutionsmentioning

confidence: 99%

“…See Refs. [21,30] for more details on the mapping between functions of λ and functions of (λ r , λ θ ).…”

Section: Setupmentioning

confidence: 99%

Resonantly enhanced and diminished strong-field gravitational-wave fluxes

Flanagan

Hughes

Ruangsri³

2014

Phys. Rev. D

Self Cite

113

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“…For bound orbits, the source is nicely described by a harmonic expansion. The continuous frequency ω goes over to a discrete set ω mkn = mΩ φ + kΩ θ + nΩ r , where Ω φ,θ,r describe motion in φ, θ, and r [32,33]. Our modes become 4 index objects, (lmkn).…”

Section: Adiabatic Radiation Reaction (Arr)mentioning

confidence: 99%

Gravitational Radiation Reaction and Inspiral Waveforms in the Adiabatic Limit

et al. 2005

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We describe progress evolving an important limit of binary orbits in general relativity, that of a stellar mass compact object gradually spiraling into a much larger, massive black hole. These systems are of great interest for gravitational wave observations. We have developed tools to compute for the first time the radiated fluxes of energy and angular momentum, as well as instantaneous snapshot waveforms, for generic geodesic orbits. For special classes of orbits, we compute the orbital evolution and waveforms for the complete inspiral by imposing global conservation of energy and angular momentum. For fully generic orbits, inspirals and waveforms can be obtained by augmenting our approach with a prescription for the self force in the adiabatic limit derived by Mino. The resulting waveforms should be sufficiently accurate to be used in future gravitational-wave searches. PACS numbers: 04.30.Db, 04.25.Nx, 95.30.Sf, 97.60.Lf The late dynamics of a merging compact binary remains one of the greatest challenges of general relativity (GR). GR doesn't have a "two body" problem so much as it has a "one spacetime" problem: one must use the Einstein field equations to find the dynamical spacetime describing a multibody system. Although numerical relativity has made great progress in recent years (e.g., [1] and references therein), most astrophysically relevant progress has come from identifying a small parameter which defines a perturbative expansion. One such approach is post-Newtonian (PN) theory (e.g., [2] and references therein) -essentially, an expansion in interaction potential GM/rc 2 . PN theory works very well when the bodies' separation r is large. As the bodies come close, the expansion must be iterated to high order (though it may be possible to modify the expansion to improve its convergence [3]).Strong field binaries can be modeled very accurately if one member is far more massive than the other. The spacetime is then that of the larger body plus a perturbation due to the smaller body, with the mass ratio acting as an expansion parameter. This limit is not just of formal interest: binaries consisting of "small" compact bodies (white dwarfs, neutron stars, or black holes with mass µ ∼ 1 − 100 M ⊙ ) captured onto highly eccentric orbits of massive black holes (M ∼ 10 5 − 10 7 M ⊙ ) are important targets for space-based gravitational-wave (GW) antennae, especially the LISA [4] mission. Such captures are estimated to occur with a rate density ∼ 10 ±1 Gpc −3 yr −1 . Convolving with LISA's planned sensitivity, one expects to measure dozens to thousands of events per year [5]. Precisely measuring GW phase as the smaller body spirals into the black hole (driven by GW backreaction) and fitting to detailed models will determine system parameters with extraordinary accuracy. For example, the hole's mass and spin should be determined to < ∼ 0.1% [6]. It should even be possible to "map" the black hole's spacetime, testing whether it satisfies GR's stringent requirements [7,8].Thanks to their extremal mass ratio, a f...

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“…Subsequent work using this formalism has progressed to the point where the emission from a particle on any orbit in the Schwarzschild spacetime [8] or on a circular inclined [9] or eccentric equatorial [10] orbit in the Kerr background can be treated. Computing the inspiral of stars on eccentric nonequatorial orbits in Kerr required overcoming some technical obstacles [9], but first results are now available [11,12].…”

Section: Introductionmentioning

confidence: 99%

Semirelativistic approximation to gravitational radiation from encounters with nonspinning black holes

2005

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The capture of compact bodies by black holes in galactic nuclei is an important prospective source for low frequency gravitational wave detectors, such as the planned Laser Interferometer Space Antenna. This paper calculates, using a semirelativistic approximation, the total energy and angular momentum lost to gravitational radiation by compact bodies on very high eccentricity orbits passing close to a supermassive, nonspinning black hole; these quantities determine the characteristics of the orbital evolution necessary to estimate the capture rate. The semirelativistic approximation improves upon treatments which use orbits at Newtonian order and quadrupolar radiation emission, and matches well onto accurate Teukolsky simulations for low eccentricity orbits. Formulas are presented for the semirelativistic energy and angular momentum fluxes as a function of general orbital parameters.

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Rotating black hole orbit functionals in the frequency domain

Cited by 130 publications

References 20 publications

Resonantly enhanced and diminished strong-field gravitational-wave fluxes

Resonantly enhanced and diminished strong-field gravitational-wave fluxes

Gravitational Radiation Reaction and Inspiral Waveforms in the Adiabatic Limit

Semirelativistic approximation to gravitational radiation from encounters with nonspinning black holes

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