Add to ORKGBy introducing a series of mathematical symbols and the phase quantization condition, we give a new definition of the phase operator, which not only is made directly in infinite state spaces, but also circumvents all difficulties appearing in the traditional approach Properties of the phase operator and its expressions in some widely-used representations are also given
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
The well-known difficulties of defining a phase operator of an oscillator are considered from the po...
Phase operators are constructed using a Klauder-Berezin coherent state quantization in finite Hilber...
Describing the phase of an electromagnetic field mode or harmonic oscillator has been an obstacle si...
An alternative derivation of the Pegg-Barnett phase operator is presented. This approach is based on...
To find an operator representation of the phase variable of a single-mode electromagnetic field, the...
Accepted for publication in Journal of Physics A: Mathematical and Theoretical as a paper (J. Phys. ...
Requirements of a conjugate operator are emphasized, especially in its role in uncertainty relations...
A simple approach to phase-space representation of quantum state vectors using the displacement-oper...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
The well-known difficulties of defining a phase operator of an oscillator are considered from the po...
Phase operators are constructed using a Klauder-Berezin coherent state quantization in finite Hilber...
Describing the phase of an electromagnetic field mode or harmonic oscillator has been an obstacle si...
An alternative derivation of the Pegg-Barnett phase operator is presented. This approach is based on...
To find an operator representation of the phase variable of a single-mode electromagnetic field, the...
Accepted for publication in Journal of Physics A: Mathematical and Theoretical as a paper (J. Phys. ...
Requirements of a conjugate operator are emphasized, especially in its role in uncertainty relations...
A simple approach to phase-space representation of quantum state vectors using the displacement-oper...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...