Minimum uncertainty states for amplitude-squared squeezing: Hermite polynomial states
- 1 January 1991
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review A
- Vol. 43 (1) , 515-520
- https://doi.org/10.1103/physreva.43.515
Abstract
The real and imaginary parts of the square of the field amplitude are the variables that describe amplitude-squared squeezing. These quantities obey an uncertainty relation. Here we find a particularly simple subset of the states that satisfy the uncertainty relation as an equality. These states are constructed by applying a squeeze operator to a state that consists of a Hermite polynomial, whose argument is the mode creation operator multiplied by a constant, acting on the vacuum. The squeezed vacuum is such a state. These states may or may not be squeezed in the normal sense, and may or may not have sub-Poissonian photon statistics.Keywords
This publication has 9 references indexed in Scilit:
- SU(1,1) Squeezing of SU(1,1) Generalized Coherent StatesJournal of Modern Optics, 1990
- Squeezing and photon number in the Jaynes-Cummings modelPhysical Review A, 1989
- Amplitude-squared squeezing of the electromagnetic fieldPhysical Review A, 1987
- Squeezing of the square of the field amplitude in second harmonic generationOptics Communications, 1987
- Dynamics of SU(1,1) coherent statesPhysical Review A, 1985
- Coherent states, squeezed fluctuations, and the SU(2) am SU(1,1) groups in quantum-optics applicationsJournal of the Optical Society of America B, 1985
- Quantum Statistics of Linear and Nonlinear Optical PhenomenaPublished by Springer Nature ,1984
- On intelligent spin statesJournal of Mathematical Physics, 1976
- Generalized Coherent StatesPhysical Review D, 1971