SU(1, 1) and SU(2) Perelomov number coherent states: algebraic approach for general systems
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Publication:5231047
DOI10.1080/14029251.2016.1248158zbMath1421.81061arXiv1206.1555OpenAlexW3104962220MaRDI QIDQ5231047
V. D. Granados, M. Salazar-Ramírez, D. Ojeda-Guillén, Roberto D. Mota
Publication date: 29 August 2019
Published in: Journal of Nonlinear Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1206.1555
Applications of Lie groups to the sciences; explicit representations (22E70) Coherent states (81R30) Lie algebras of Lie groups (22E60)
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Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The action option and a Feynman quantization of spinor fields in terms of ordinary \(C\)-numbers
- Factorization method in quantum mechanics
- \(SU(2)\) and \(SU(1,1)\) algebra eigenstates: A unified analytic approach to coherent and intelligent states
- Displaced and squeezed number states.
- New 'coherent' states associated with non-compact groups
- Coherent states for arbitrary Lie group
- Spin Number Coherent States and the Problem of Two Coupled Oscillators*
- Radial coherent states for central potentials: The isotropic harmonic oscillator
- Effects of inflation on generalized economic order quantities
- Robertson intelligent states
- Generalized intelligent states and squeezing
- Analytic representations based onSU(1 , 1) coherent states and their applications
- Information and entropy in the baker’s map
- Completeness and geometry of Schrödinger minimum uncertainty states
- The SU(1, 1) Perelomov number coherent states and the non-degenerate parametric amplifier
- Continuous-Representation Theory. I. Postulates of Continuous-Representation Theory
- PERELOMOV AND BARUT–GIRARDELLO SU(1, 1) COHERENT STATES FOR HARMONIC OSCILLATOR IN ONE-DIMENSIONAL HALF SPACE
- Equivalence of Semiclassical and Quantum Mechanical Descriptions of Statistical Light Beams
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