Abstract:
An observer-dependent Hamiltonian is introduced. The vacuum state is defined by means of Hamiltonian diagonalization and minimization, which result to be equivalent criteria. This method encompasses a great number of known vacuum definitions, and works in an arbitrary geometry if the observers field satisfies certain properties. © 1986 The American Physical Society.
Registro:
Documento: |
Artículo
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Título: | Observer-dependent quantum vacua in curved space |
Autor: | Castagnino, M.; Ferraro, R. |
Filiación: | Instituto de Física de Rosario (CONICET-UNR), Facultad de Ingeniería, Av. Pellegrini 250, 2000 Rosario, Argentina Instituto de Astronomía y Física Del Espacio, Casilla de Correo 67, Sucursal 28, 1428 Buenos Aires, Argentina Mathematics Department, Facultad de Ciencias Exactas y Naturales, Universidad de Buenos Aires, 1428 Buenos Aires, Argentina
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Año: | 1986
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Volumen: | 34
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Número: | 2
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Página de inicio: | 497
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Página de fin: | 503
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DOI: |
http://dx.doi.org/10.1103/PhysRevD.34.497 |
Título revista: | Physical Review D
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ISSN: | 05562821
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Registro: | https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_05562821_v34_n2_p497_Castagnino |
Referencias:
- Fulling, S.A., (1979) Gen. Relativ. Gravit., 10, p. 807
- Grib, A.A., Mamayev, S.G., Mostepanenko, V.M., (1980) J. Phys. A, 13, p. 2057
- Birrel, N.D., Davies, P.C.W., (1982) Quantum Fields in Curved Space, , Cambridge University Press, Cambridge
- Unruh, W.G., (1976) Phys. Rev. D, 14, p. 870
- Sánchez, N., Analytic mappings: A new approach to quantum field theory in accelerated frames (1981) Physical Review D, 24, p. 2100
- Brown, M.R., Ottewill, A.C., Siklos, T.C., (1982) Phys. Rev. D, 26, p. 1881. , and S
- Castagnino, M., Mazzittelli, F.D., (1985) Phys. Rev. D, 31, p. 742
- M. Castagnino, in Quantum Gravity, proceedings of Third Seminar, Moscow, 1984, edited by M. A. Markov et al. (World Scientific, Singapore, 1985), p. 496; Cattaneo, C., (1958) Nuovo Cimento, 10, p. 318
- Moller, C., (1952) The Theory of Relativity, , Oxford University Press, London
- Ashtekar, A., Magnon, A., Quantum Fields in Curved Space-Times (1975) Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, 346 A, p. 375
- Misner, C.W., Thorne, K.S., Wheeler, J.A., (1973) Gravitation, , Freeman, San Francisco
- Hawking, S.W., Ellis, G.F.R., (1973) The Large Scale Structure of Space-Time, , Cambridge University Press, Cambridge, England
- It may be proved that different choices for Ek do not modify the vacuum because they only involve Bogoliubov's transformations (Ref. 3) with vanishing beta coefficients; Boulware, D., (1975) Phys. Rev. D, 11, p. 1404
- Ford, L.H., (1975) Phys. Rev. D, 11, p. 3370
- Ford, L.H., (1976) Phys. Rev. D, 14, p. 3304
- Castagnino, M., Nuñez, C.A., (1985) Rev. Mex. Astron. Astrofis., 10, p. 43
- Castagnino, M., Ferraro, R., (1985) Ann. Phys. (N.Y.), 161, p. 1
- Born, M., (1909) Ann. Phys. (Leipzig), 30, p. 1
Citas:
---------- APA ----------
Castagnino, M. & Ferraro, R.
(1986)
. Observer-dependent quantum vacua in curved space. Physical Review D, 34(2), 497-503.
http://dx.doi.org/10.1103/PhysRevD.34.497---------- CHICAGO ----------
Castagnino, M., Ferraro, R.
"Observer-dependent quantum vacua in curved space"
. Physical Review D 34, no. 2
(1986) : 497-503.
http://dx.doi.org/10.1103/PhysRevD.34.497---------- MLA ----------
Castagnino, M., Ferraro, R.
"Observer-dependent quantum vacua in curved space"
. Physical Review D, vol. 34, no. 2, 1986, pp. 497-503.
http://dx.doi.org/10.1103/PhysRevD.34.497---------- VANCOUVER ----------
Castagnino, M., Ferraro, R. Observer-dependent quantum vacua in curved space. 1986;34(2):497-503.
http://dx.doi.org/10.1103/PhysRevD.34.497