Vaidya Space-Time in Black-Hole Evaporation

Farley, A. N.; D’Eath, P. D.

doi:10.1007/s10714-006-0231-3

Cited by 23 publications

(50 citation statements)

References 18 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Finally, then, following Feynman's + iε prescription in the present context of black-hole quantum evaporation, one recovers the Lorentzian quantum amplitude (again, not just the probability density) for the quantum state including (say) created particles present at late times, by taking the limit of the semi-classical amplitude exp iS (2) class as δ → 0 + . As seen in [4,6,8], the black-hole radiation has the usual thermal spectrum, at the temperature 1/8πM I . Unless otherwise stated, we employ Planckian units, taking:…”

Section: Introductionmentioning

confidence: 93%

“…And W KB investigation of wave equations such as Eqs. (2.4,5) is also at the base of the present approach [4,6,8]. One might say that detailed knowledge concerning the (Lorentzian) event horizon is 'imbedded' in the relevant spin-s wave equations, such as Eqs.…”

Section: Introductionmentioning

confidence: 95%

“…As seen in [2,6], the spherically-symmetric background metric in this region can be represented to high accuracy by a Vaidya metric, which describes the outflow of massless matter, which is spherically symmetric, on the average. The principal condition for the validity of the adiabatic expansion is [6] that…”

Section: The Quantum Amplitude For Late-time Datamentioning

confidence: 99%

“…The mode equation (2.12) does not depend on the quantum number m , whence we may choose ξ kℓm (r) = ξ kℓ (r) , independently of m . The boundary condition of regularity at the spatial origin {r = 0} [4,6] implies that…”

Section: The Quantum Amplitude For Late-time Datamentioning

confidence: 99%

See 3 more Smart Citations

Quantum amplitudes in black-hole evaporation: coherent and squeezed states

Farley

D’Eath

2006

Class. Quantum Grav.

View full text Add to dashboard Cite

In earlier papers, the quantum amplitude for processes involving the formation and evaporation of black holes was calculated by means of a complex-time approach. Instead of taking a more familiar approach to black-hole evaporation, we simply followed Feynman's + iε approach in quantum field theory. The Lorentzian time-interval T , measured at spatial infinity between a pair of asymptotically-flat space-like hypersurfaces Σ I and Σ F carrying initial and final boundary data for the gravitational and other fields, is rotated: T → |T | exp(− iδ) , where 0 < δ ≤ π/2 . Classically and quantum-mechanically, this procedure is expected to lead to a well-posed boundary-value problem. Thus, what we have done is to find quantum amplitudes (not just probability densities) relating to a pure state at late times following gravitational collapse of matter to a black hole. Such pure states, arising from gravitational collapse, are then shown to admit a description in terms of coherent and squeezed states. Indeed, this description is not so different from that arising in a well-known context, namely, the highly-squeezed final state of the relic radiation background in inflationary cosmology. For definiteness, we study the simplest model of collapse, based on Einstein gravity with a massless scalar field. Following the complex rotation above, one finds that, in an adiabatic approximation, the resulting quantum amplitude may be expressed in terms of generalised coherent states of the harmonic oscillator. A physical interpretation is given; further, a squeezed-state representation follows.

show abstract

Section: Introductionmentioning

confidence: 93%

Section: Introductionmentioning

confidence: 95%

Section: The Quantum Amplitude For Late-time Datamentioning

confidence: 99%

Section: The Quantum Amplitude For Late-time Datamentioning

confidence: 99%

See 2 more Smart Citations

Quantum amplitudes in black-hole evaporation: coherent and squeezed states

Farley

D’Eath

2006

Class. Quantum Grav.

View full text Add to dashboard Cite

show abstract

“…Afterwards, some models to describe the classical essence of this radiation in a language which is free from the usual quantum field theoretic tools and is more familiar to the astrophysicists and relativists, have been introduced. For instance, the Vaidya solution [8][9][10] has provided a simple classical model for the black hole radiation and has been vastly investigated in this regard [11][12][13][14][15][16][17], see also [18][19][20][21][22][23][24][25][26][27][28][29] for more studies. In fact, the Vaidya solution is one of the non-static solutions of the Einstein field equations and can be regarded as a generalization of the static Schwarzschild black hole solution.…”

Section: Introductionmentioning

confidence: 99%

Surrounded Vaidya solution by cosmological fields

Heydarzade

Darabi

2018

Eur. Phys. J. C

View full text Add to dashboard Cite

In the present work, we study the general surrounded Vaidya solution by the various cosmological fields and its nature describing the possibility of the formation of naked singularities or black holes. Motivated by the fact that real astrophysical black holes as non-stationary and nonisolated objects are living in non-empty backgrounds, we focus on the black hole subclasses of this general solution describing a dynamical evaporating-accreting black holes in the dynamical cosmological backgrounds of dust, radiation, quintessence, cosmological constant-like and phantom fields, the so called "surrounded Vaidya black hole". Then, we analyze the timelike geodesics associated with the obtained surrounded black holes and we find that some new correction terms arise relative to the case of Schwarzschild black hole. Also, we address some of the subclasses of the obtained surrounded black hole solution for both dynamical and stationary limits. Moreover, we classify the obtained solutions according to their behaviors under imposing the positive energy condition and discuss how this condition imposes some severe and important restrictions on the black hole and its background field dynamics.

show abstract

Radiating black holes in Einstein-Maxwell-dilaton theory and cosmic censorship violation

Aniceto

Pani

Rocha

2016

J. High Energ. Phys.

View full text Add to dashboard Cite

We construct exact, time-dependent, black hole solutions of Einstein-Maxwelldilaton theory with arbitrary dilaton coupling, a. For a = 1 this theory arises as the fourdimensional low-energy effective description of heterotic string theory. These solutions represent electrically charged, spherically symmetric black holes emitting or absorbing charged null fluids and generalize the Vaidya and Bonnor-Vaidya solutions of general relativity and of Einstein-Maxwell theory, respectively. The a = 1 case stands out as special, in the sense that it is the only choice of the coupling that allows for a time-dependent dilaton field in this class of solutions. As a by-product, when a = 1 we show that an electrically charged black hole in this theory can be overcharged by bombarding it with a stream of electrically charged null fluid, resulting in the formation of a naked singularity. This provides an example of cosmic censorship violation in an exact dynamical solution to low-energy effective string theory and in a case in which the total stress-energy tensor satisfies all energy conditions. When a = 1, our solutions necessarily have a time-independent scalar field and consequently cannot be overcharged.

show abstract

Vaidya Space-Time in Black-Hole Evaporation

Cited by 23 publications

References 18 publications

Quantum amplitudes in black-hole evaporation: coherent and squeezed states

Quantum amplitudes in black-hole evaporation: coherent and squeezed states

Surrounded Vaidya solution by cosmological fields

Radiating black holes in Einstein-Maxwell-dilaton theory and cosmic censorship violation

Contact Info

Product

Resources

About