Stability of Higher-Dimensional Schwarzschild Black Holes

Ishibashi, Akihiro; Kodama, Hideo

doi:10.1143/ptp.110.901

Cited by 317 publications

(464 citation statements)

References 16 publications

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“…If we set a = 0 then we have a Schwarzschild(-AdS) black hole and our tensor perturbations should form a subset of the tensor perturbations considered in [4,5,6]. Demanding agreement between our results and those of [6] yields…”

Section: Harmonics On Cp Nmentioning

confidence: 55%

Gravitational perturbations of higher dimensional rotating black holes: Tensor perturbations

2006

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Assessing the stability of higher-dimensional rotating black holes requires a study of linearized gravitational perturbations around such backgrounds. We study perturbations of Myers-Perry black holes with equal angular momenta in an odd number of dimensions (greater than five), allowing for a cosmological constant. We find a class of perturbations for which the equations of motion reduce to a single radial equation. In the asymptotically flat case we find no evidence of any instability. In the asymptotically anti-de Sitter case, we demonstrate the existence of a superradiant instability that sets in precisely when the angular velocity of the black hole exceeds the speed of light from the point of view of the conformal boundary. We suggest that the endpoint of the instability may be a stationary, nonaxisymmetric black hole.

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Section: Harmonics On Cp Nmentioning

confidence: 55%

Gravitational perturbations of higher dimensional rotating black holes: Tensor perturbations

2006

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“…Linearized perturbations of higher-dimensional BHs are now well understood, at least in the nonrotating case [27][28][29][30]. Historically, perturbative methods such as the close-limit approximation [32] (recently extended to higher dimensions [33,34]) have provided guidance and insight in the numerical analysis of BH mergers in general relativity.…”

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confidence: 99%

Radiation from particles with arbitrary energy falling into higher-dimensional black holes

2011

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We consider point particles with arbitrary energy per unit mass E that fall radially into a higherdimensional, nonrotating, asymptotically flat black hole. We compute the energy and linear momentum radiated in this process as functions of E and of the spacetime dimensionality D = n + 2 for n = 2, . . . , 9 (in some cases we go up to 11). We find that the total energy radiated increases with n for particles falling from rest (E = 1). For fixed particle energies 1 < E ≤ 2 we show explicitly that the radiation has a local minimum at some critical value of n, and then it increases with n. We conjecture that such a minimum exists also for higher particle energies. The present point-particle calculation breaks down when n = 11, because then the radiated energy becomes larger than the particle mass. Quite interestingly, for n = 11 the radiated energy predicted by our calculation would also violate Hawking's area bound. This hints at a qualitative change in gravitational radiation emission for n 11. Our results are in very good agreement with numerical simulations of low-energy, unequal-mass black hole collisions in D = 5 (that will be reported elsewhere) and they are a useful benchmark for future nonlinear evolutions of the higher-dimensional Einstein equations.

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“…on, one could achieve the positivity of gravitational potentials by using the S-deformed technique [43], proving the stability of SAdS black hole exactly [44]. This implies that there is no connection between classical stability and thermodynamic instability (C SAdS < 0) for small SAdS black hole.…”

Section: Jhep04(2014)058mentioning

confidence: 98%

Thermodynamic and classical instability of AdS black holes in fourth-order gravity

Myung

Moon

2014

J. High Energ. Phys.

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Abstract:We study thermodynamic and classical instability of AdS black holes in fourthorder gravity. These include the BTZ black hole in new massive gravity, Schwarzschild-AdS black hole, and higher-dimensional AdS black holes in fourth-order gravity. All thermodynamic quantities which are computed using the Abbot-Deser-Tekin method are used to study thermodynamic instability of AdS black holes. On the other hand, we investigate the s-mode Gregory-Laflamme instability of the massive graviton propagating around the AdS black holes. We establish the connection between the thermodynamic instability and the GL instability of AdS black holes in fourth-order gravity. This shows that the Gubser-Mitra conjecture holds for AdS black holes found from fourth-order gravity.

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Stability of Higher-Dimensional Schwarzschild Black Holes

Cited by 317 publications

References 16 publications

Gravitational perturbations of higher dimensional rotating black holes: Tensor perturbations

Gravitational perturbations of higher dimensional rotating black holes: Tensor perturbations

Radiation from particles with arbitrary energy falling into higher-dimensional black holes

Thermodynamic and classical instability of AdS black holes in fourth-order gravity

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