We propose a new method for describing phase distributions of nonclassical states in optical systems based on the nonnegative quantum distribution function. A comparison of the proposed method with other known methods such as the Pegg-Barnett and operational ones is given. © Pleiades Publishing, Ltd. 2007
Using the formalism of dynamical maps it is shown that if a quantum measurement process is to be des...
Statistical Methods in Quantum Optics 2 - Non-Classical Fields continues the development of the meth...
Positive operator valued measures representing phase observables for systems with arbitrary discrete...
We propose a new method for describing phase distributions of nonclassical states in optical systems...
A broad class of representations for the density matrix of phase-space functions is proposed. It is ...
The idea that the phase of single-mode field may be correctly defined as a phase difference between ...
A clear physical meaning of the Carruthers-Nieto symmetric quantum phase fluctuation parameter (U) h...
The theoretical investigation of fluctuations of the light amplitude and phase in non-classical stat...
The representation of quantum states via phase-space functions constitutes an intuitive technique to...
Quantum-mechanical phase distributions are investigated for some nonlinear optical phenomena which, ...
The problem of relating the semiclassical and quantum treatments of statistical states of an optical...
We discuss a phase-space description of the photon number distribution of nonclassical states which ...
The notion of f-oscillators generalizing q-oscillators is discussed. For the classical and quantum c...
Wódkiewicz1 has derived an operational formula for a positive phase-space distribution function in q...
This chapter reports on theoretical protocols for generating nonclassical states of light and mechan...
Using the formalism of dynamical maps it is shown that if a quantum measurement process is to be des...
Statistical Methods in Quantum Optics 2 - Non-Classical Fields continues the development of the meth...
Positive operator valued measures representing phase observables for systems with arbitrary discrete...
We propose a new method for describing phase distributions of nonclassical states in optical systems...
A broad class of representations for the density matrix of phase-space functions is proposed. It is ...
The idea that the phase of single-mode field may be correctly defined as a phase difference between ...
A clear physical meaning of the Carruthers-Nieto symmetric quantum phase fluctuation parameter (U) h...
The theoretical investigation of fluctuations of the light amplitude and phase in non-classical stat...
The representation of quantum states via phase-space functions constitutes an intuitive technique to...
Quantum-mechanical phase distributions are investigated for some nonlinear optical phenomena which, ...
The problem of relating the semiclassical and quantum treatments of statistical states of an optical...
We discuss a phase-space description of the photon number distribution of nonclassical states which ...
The notion of f-oscillators generalizing q-oscillators is discussed. For the classical and quantum c...
Wódkiewicz1 has derived an operational formula for a positive phase-space distribution function in q...
This chapter reports on theoretical protocols for generating nonclassical states of light and mechan...
Using the formalism of dynamical maps it is shown that if a quantum measurement process is to be des...
Statistical Methods in Quantum Optics 2 - Non-Classical Fields continues the development of the meth...
Positive operator valued measures representing phase observables for systems with arbitrary discrete...
DOI
Add to ORKG