Quantum fields in curved spacetime

Hollands, Stefan; Wald, Robert M.

doi:10.1016/j.physrep.2015.02.001

Cited by 182 publications

(145 citation statements)

References 67 publications

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“…Furthermore, the argument of Fredenhagen and Haag [7], [8] shows that Hawking radiation for black holes can be derived as a consequence of the Hadamard behavior of the state near the horizon at relatively late times, without the necessity to evolve backward all the way into a transplanckian regime.…”

Section: Entanglementmentioning

confidence: 99%

Information loss

2017

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The complete gravitational collapse of a body in general relativity will result in the formation of a black hole. Although the black hole is classically stable, quantum particle creation processes will result in the emission of Hawking radiation to infinity and corresponding mass loss of the black hole, eventually resulting in the complete evaporation of the black hole. Semiclassical arguments strongly suggest that, in the process of black hole formation and evaporation, a pure quantum state will evolve to a mixed state, i.e., there will be "information loss." There has been considerable controversy over this issue for more than 40 years. In this review, we present the arguments in favor of information loss, and analyze some of the counter-arguments and alternative possibilities.

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Section: Entanglementmentioning

confidence: 99%

Information loss

2017

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“…On one hand, the intrinsic quantization procedure is plagued with ordering ambiguities that allow for multiple consistent quantization procedures different by a term proportional to the curvature of the submanifold [10][11][12][13][14]. On the other hand, the confining potential procedure leads to a unique effective Hamiltonian that depends on the constraint.…”

Section: The Geometric Field In the Schrödinger Equationmentioning

confidence: 99%

Gravitation at the Josephson Junction

Atanasov

2018

Advances in Condensed Matter Physics

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A geometric potential from the kinetic term of a constrained to a curved hyperplane of space-time quantum superconducting condensate is derived. An energy conservation relation involving the geometric field at every material point in the superconductor is demonstrated. At a Josephson junction the energy conservation relation implies the possibility of transforming electric energy into geometric field energy, that is, curvature of space-time. Experimental procedures to verify that the Josephson junction can act as a voltage-to-curvature converter are discussed.

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“…This begs the question, 'Why should one accept anything defined in terms of the coordinate boundary τ = −∞ as true initial conditions for a cosmological model?' One answer is that the Bunch-Davies vacuum can be defined as a vacuum state for the whole of de Sitter space-time; in fact, it is invariant under O(4, 1), the symmetry group of de Sitter space-time (Hollands and Wald, 2014). For a massive scalar field, there is a one-complex parameter family of vacuum states in de Sitter space-time, all of which are invariant under O(4, 1), and which include the Bunch-Davies vacuum as a special case (Allen, 1985).…”

Section: Then V(x τ ) Is Expressed As An Inverse Fourier Transformmentioning

confidence: 99%

Inflationary cosmology and the scale-invariant spectrum

McCabe¹

2018

Studies in History and Philosophy of Science Part B: Studies in

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The claim of inflationary cosmology to explain certain observable facts, which the Friedmann-Roberston-Walker models of 'Big-Bang' cosmology were forced to assume, has already been the subject of significant philosophical analysis. However, the principal empirical claim of inflationary cosmology, that it can predict the scale-invariant power spectrum of density perturbations, as detected in measurements of the cosmic microwave background radiation, has hitherto been taken at face value by philosophers.The purpose of this paper is to expound the theory of density perturbations used by inflationary cosmology, to assess whether inflation really does predict a scale-invariant spectrum, and to identify the assumptions necessary for such a derivation.The first section of the paper explains what a scale-invariant powerspectrum is, and the requirements placed on a cosmological theory of such density perturbations. The second section explains and analyses the concept of the Hubble horizon, and its behaviour within an inflationary space-time. The third section expounds the inflationary derivation of scale-invariance, and scrutinises the assumptions within that derivation. The fourth section analyses the explanatory role of 'horizon-crossing' within the inflationary scenario.

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Quantum fields in curved spacetime

Cited by 182 publications

References 67 publications

Information loss

Information loss

Gravitation at the Josephson Junction

Inflationary cosmology and the scale-invariant spectrum

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