Abstract
Quantization of an electromagnetic field in a cavity filled with a uniform medium having a time-varying dielectric constant and in a cavity with a moving wall is considered. It is shown that squeezed and correlated states of the field can be generated. The possible limits of the squeezing and correlation coefficients are indicated. Two methods of parametric buildup of field modes, by variation of the dielectric constant and by vibrating the cavity wall at double the frequency, are compared.
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Literature Cited
M. Born and L. Infeld, Proc. R. Soc. London A147, 522 (1934); A150, 141 (1935).
J. M. Jauch and K. M. Watson, Phys. Rev.,74, 950 (1948).
V. L. Ginzburg, Theoretical Physics and Astrophysics, Pergamon (1979).
I. Abram, Phys. Rev. A,35, 4661 (1987).
L. Knöll, N. Vogel, and D.-G. Welsch Phys. Rev. A,36, 4803 (1987).
R. J. Glauber and M. Lowenstein, Preprint HUTP-90/B001 (Harvard University).
V. V. Dodonov and V. I. Man'ko, Invariants and Evolution of Nonstationary Quantum Systems, Proceedings of the Lebedev Physics Institute,183, Nova Science (1989).
V. V. Dodonov, A. B. Klimov, and V. I. Man'ko,ibid.,200, 56 (1991).
V. V. Dodonov, V. I. Man'ko, and V. N. Rudenko, Pis'ma Zh. Eksp. Teor. Fiz.,36, 53 (1982) [JETP Lett.,36, 63 (1982)].
G. T. Moore, J. Math. Phys.,11, 2679 (1979).
R. T. Baranov and Yu. N. Shirokov, Zh. Éksp. Teor. Fiz.,53, 2123 (1967).
M. Bordag, F. M. Dittes, and D. Robashik, Yad. Fiz.,43, 1606 (1986).
S. Sarkar, J. Phys. A,21, 971 (1988).
S. Sarkar, in: Photons and Quantum Fluctuations, Hilger, Bristol (1988), p. 151.
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Dodonov, V.V., Klimov, A.B. & Man'ko, V.I. Quantization and generation of squeezed states of electromagnetic field in a cavity with variable parameters. J Russ Laser Res 12, 439–446 (1991). https://doi.org/10.1007/BF01120270
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DOI: https://doi.org/10.1007/BF01120270