Summary
Squeezing phenomenon is analysed for the non-stationary forced harmonic oscillator which is perturbed parametrically by very short pulses. The energy of the oscillator, distribution function and the squeezing coefficients as well as some other values are calculated for the models of δ-pulses, rectangular steps and some others types of time-dependence of the frequency of the oscillator.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
J. Janszky andY. Yushin:Phys. Rev. A,36, 1228 (1987).
V. V. Dodonov andV. I. Man’ko:Proc. P. N. Lebedev Phys. Inst., Vol.183 (Nauka, Moscow, 1987), p. 71.
Y. S. Kim andV. I. Man’ko:Phys. Lett. A,157, 226 (1991).
V. V. Dodonov, O. V. Man’ko andV. I. Man’ko:Proc. P. N. Lebedev Phys. Inst., Vol.208 (Nauka, Moscow, 1992).
V. I. Man’ko:Time-Dependent Invariants and Nonclassical Light, NATO ASI Ser. B, Vol.282 (1992).
I. A. Malkin, V. I. Man’ko andD. A. Trifonov:Phys. Lett. A,30, 414 (1969).
R. Glauber:Phys. Rev. Lett.,10, 84 (1963).
K. Husimi:Prog. Theor. Phys.,9, 381 (1953).
I. A. Malkin andV. I. Man’ko:Phys. Lett. A,32, 243 (1970).
E. Schrödinger:Ber. Kgl. Akad. Wiss. Berlin, s. 296 (1930).
H. P. Robertson:Phys. Rev. A,35, 667 (1930).
V. V. Dodonov, E. V. Kurmyshev andV. I. Man’ko:Phys. Lett. A,179, 150 (1980).
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Dodonov, V.V., Lukin, M.D. & Man’ko, V.I. Squeezing for the one-mode electromagnetic-field oscillator with δ-kicked frequency. Nuov Cim B 109, 1023–1037 (1994). https://doi.org/10.1007/BF02723227
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/BF02723227