Black hole evaporation: information loss but no paradox

Modak, Sujoy K.; Ortíz, L.; Peña, Igor; Sudarsky, Daniel

doi:10.1007/s10714-015-1960-y

Cited by 27 publications

(46 citation statements)

References 102 publications

(141 reference statements)

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“…Hence, semi-classical physics would suggest to substitute η f = 0.555 in Eq. (23). Thus the analysis presented above naturally adopts to the semiclassical emission rates as well.…”

Section: Number Of Emitted Quantamentioning

confidence: 99%

Decoding infrared imprints of quantum origins of black holes

Chakraborty

Lochan

2019

Physics Letters B

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We analyze the emission spectrum of a (fundamentally quantum) black hole in the Kerr-Newman family by assuming a discretization of black hole geometry and the holographic entropy-area relation. We demonstrate that, given the above structure of black hole entropy, a macroscopic black hole always has non-continuously separated mass states and therefore they descend down in discrete manner. We evaluate the step size of the discrete spectrum, which vanishes in the extremal limit, leading to a continuum spectrum as expected from thermal nature of black holes. This further reveals an interesting relation, in each class, between the dynamic and kinematic length scales for all black holes belonging to the Kerr-Newman family, pointing towards a possible universal character across the class, dependent only on black hole mass. Further, we have presented the computation of maximum number of emitted quanta from the black hole as well as an estimation of its lifetime. We also argue the independence of these features from the presence of additional spacetime dimensions.

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“…Hence, semi-classical physics would suggest to substitute η f = 0.555 in Eq. (23). Thus the analysis presented above naturally adopts to the semiclassical emission rates as well.…”

Section: Number Of Emitted Quantamentioning

confidence: 99%

Decoding infrared imprints of quantum origins of black holes

Chakraborty

Lochan

2019

Physics Letters B

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“…The singularity occurs when Ω = 0 and (32) gives e −2φs = κ 4 . As we have restricted ourselves to the case ρ = φ, one can use the relation (19) (or equivalently (20)), to find the value of Ω s = √ κ 4 (1 − ln κ 4 ) associated with the singularity. Therefore the location of the singularity turns out to be:…”

Section: B Solving Semiclassical Equationsmentioning

confidence: 99%

“…The proposal was then to associate to the intrinsic breakdown of unitary evolution, which is typical of these dynamical collapse theories, [12][13][14][15][16][17][18] (which were developed to deal with the measurement problem in standard quantum mechanics) all the information loss that takes place during the formation and subsequent Hawking evaporation of the black hole. The first concrete treatments along this line are [19,20].…”

mentioning

confidence: 99%

“…The objective of the present work is to continue the research path initiated in [19]- [22] and explore an example where the remaining issue of backreaction in the setting of collapse theories. For this we will again consider a two dimensional black hole model known due to Russo-Susskind-Thorlacius (RST) [23,24] which presents a solution of the semiclassical (Einstein) equation in 2D.…”

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confidence: 99%

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Collapse of the wavefunction, the information paradox and backreaction

Modak

Sudarsky

2018

Eur. Phys. J. C

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We consider the black hole information problem within the context of collapse theories in a scheme that allows the incorporation of the backreaction to the Hawking radiation. We explore the issue in a setting of the two dimensional version of black hole evaporation known as the Russo-Susskind-Thorlacius model. We summarize the general ideas based on the semiclassical version of Einstein's equations and then discuss specific modifications that are required in the context of collapse theories when applied to this model.

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“…In contrast, inertial thermal states are truly statistical mixtures of pure states (energy-momentum eigenstates according to inertial observers), representing the whole system -which qualifies them as proper mixed states. Although this kind of distinction may be relevant on a conceptual level -see, e.g., Ref 10. for a discussion in the context of information loss in black hole evaporation -, it plays no role for our purposes since observables restricted to the Rindler wedge cannot uncover the improper nature of the Unruh thermal bath.…”

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confidence: 99%

Probing the Unruh effect with an accelerated extended system

et al. 2019

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It has been proved in the context of quantum fields in Minkowski spacetime that the vacuum state is a thermal state according to uniformly accelerated observers—a seminal result known as the Unruh effect. Recent claims, however, have challenged the validity of this result for extended systems, thus casting doubts on its physical reality. Here, we study the dynamics of an extended system, uniformly accelerated in the vacuum. We show that its reduced density matrix evolves to a Gibbs thermal state with local temperature given by the Unruh temperature , where a is the system’s spatial-dependent proper acceleration— c is the speed of light and k B and are the Boltzmann’s and the reduced Planck’s constants, respectively. This proves that the vacuum state does induce thermalization of an accelerated extended system—which is all one can expect of a legitimate thermal reservoir.

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Black hole evaporation: information loss but no paradox

Cited by 27 publications

References 102 publications

Decoding infrared imprints of quantum origins of black holes

Decoding infrared imprints of quantum origins of black holes

Collapse of the wavefunction, the information paradox and backreaction

Probing the Unruh effect with an accelerated extended system

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