Abstract
In this paper we study quasiprobability distribution and phase distribution for coherent states, squeezed states, and Kerr states in one-mode interacting Fock space.
Similar content being viewed by others
REFERENCES
Accardi, L. and Bozejko, M. (1998). InteractingFock Space and Gaussianization of Probability Measures. Infinite Dimensional Analysis, Quantum Probability and Related Topics 1(4), 663–670.
Accardi, L. and Nhani, M. (2001). The interactingFock space of Haldane's exclusion statistics. Preprint No. 1.
Agarwal, G. S., Chaturvedi, S., Tara, K., and Srinivasan, V. (1992).Classical phase changes in nonlinear processes and their quantum counterparts, Physical Review A 45, 4904.
Carruthers, P.and Nieto, M. M. (1968). Phase and angle variables in quantum mechanics. Reviews of Modern Physics 40, 411.
Dirac, P.A. M. (1927). Proceedings of the Royal Society of London, Series A: Mathematical and Physical Sciences 114, 243.
Das, P. K.(2002). Coherent states and squeezed states in interacting Fock space. International Journal of Theoretical Physics 41(6) 1099.
Helstrom, C. W. (1976). Quantum Detection and Estimation Theory,Academic Press, New York.
Pegg, D. T. and Barnett, S. M.(1989). Unitary phase operator in quantum mechanics. Europhysics Letters 6, 483.
Susskind, L. and Glogower, J. (1964).Physics 1, 49.
Shapiro, J. H. and Shepard, S. R. (1991).Quantum phase measurement: A system-theory perspective. Physics Review A 43, 3795.
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Das, P.K. Quasiprobability Distribution and Phase Distribution in Interacting Fock Space. International Journal of Theoretical Physics 41, 2013–2024 (2002). https://doi.org/10.1023/A:1021069326784
Issue Date:
DOI: https://doi.org/10.1023/A:1021069326784