Even and odd \(q\)-coherent states in a finite-dimensional basis and their squeezing properties
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Publication:1376457
DOI10.1007/BF02435753zbMath0886.46065MaRDI QIDQ1376457
Barnana Roy, Rajkumar Roychoudhury
Publication date: 18 December 1997
Published in: International Journal of Theoretical Physics (Search for Journal in Brave)
Quantum optics (81V80) Coherent states (81R30) Applications of functional analysis in quantum physics (46N50)
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Cites Work
- Quantum groups, coherent states, squeezing and lattice quantum mechanics
- Coherent state formalism for the Pegg-Barnett Hermitian phase theory
- Even and odd coherent states of a harmonic oscillator in a finite-dimensional Hilbert space and their squeezing properties
- Higher moment properties of \(k\)-boson \(q\)-coherent states
- ON THE STATISTICS OF SU(1, 1)q and SU(2)q COHERENT STATES
- q-PHASE OPERATOR IN A FINITE-DIMENSIONAL HILBERT SPACE
- q-ANALOGUE OF BOSON COMMUTATOR AND THE QUANTUM GROUPS SUq(2) AND SUq(1, 1)
- On q-analogues of the quantum harmonic oscillator and the quantum group SU(2)q
- A q-analogue of Bargmann space and its scalar product
- The q-deformed boson realisation of the quantum group SU(n)qand its representations
- The quantum group SUq(2) and a q-analogue of the boson operators
- A completeness relation for the q-analogue coherent states by q-integration
- Comment on the q-analogues of the harmonic oscillator
- Generalized q-bosons and their squeezed states
- The many-body problem for q-oscillators
- The quantum multiboson algebra and generalized coherent states of SUq(1,1)
- Generalized Holstein–Primakoff realizations and quantum group-theoretic coherent states
- Q rotations and other Q transformations as unitary nonlinear automorphisms of quantum algebras
- Even and odd phase coherent states for Hermitian phase operator theory
- A q-deformed harmonic oscillator in a finite-dimensional Hilbert space
- Multi-mode q-coherent states
- Dynamics of aQ-analogue of the Quantum Harmonic Oscillator
- Quantum algebra as the dynamical symmetry of the deformed Jaynes-Cummings model
- Squeezing and quantum groups
- Even and odd q-coherent states and their optical statistics properties
- An analogue of the unitary displacement operator for the q-oscillator
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