KLAUDER–PERELOMOV AND GAZEAU–KLAUDER COHERENT STATES FOR SOME SHAPE INVARIANT POTENTIALS
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Publication:5312354
DOI10.1142/S0217732302008095zbMath1083.81535MaRDI QIDQ5312354
Publication date: 31 August 2005
Published in: Modern Physics Letters A (Search for Journal in Brave)
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Cites Work
- Dynamical breaking of supersymmetry
- Coherent states for isospectral Hamiltonians
- Supersymmetry and shape invariance in differential equations of mathematical physics.
- New 'coherent' states associated with non-compact groups
- Coherent states for arbitrary Lie group
- Temporally stable coherent states for infinite well and Pöschl–Teller potentials
- COHERENT STATES FOR UNUSUAL POTENTIALS
- Baker-Campbell-Hausdorff formulas
- Exponential Hilbert Space: Fock Space Revisited
