Algebraic Bethe ansätze and eigenvalue-based determinants for Dicke–Jaynes–Cummings–Gaudin quantum integrable models

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DOI10.1088/1751-8113/47/40/405204zbMath1300.81085arXiv1406.0965OpenAlexW3102409728MaRDI QIDQ2926441

Alexandre Faribault, Hugo Tschirhart

Publication date: 24 October 2014

Published in: Journal of Physics A: Mathematical and Theoretical (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1406.0965

zbMATH Keywords

integrable systems Bethe ansatz equation quantum light-matter interaction

Mathematics Subject Classification ID

Quantum optics (81V80) Exactly solvable models; Bethe ansatz (82B23) Many-body theory; quantum Hall effect (81V70) Groups and algebras in quantum theory and relations with integrable systems (81R12)

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Integrable spin-${\frac{1}{2}}$ Richardson–Gaudin XYZ models in an arbitrary magnetic field ⋮ Quantum-classical duality for Gaudin magnets with boundary ⋮ Steady-states of out-of-equlibrium inhomogeneous Richardson–Gaudin quantum integrable models in quantum optics ⋮ Exact solution for the inhomogeneous Dicke model in the canonical ensemble: thermodynamical limit and finite-size corrections ⋮ Quantum-classical correspondence for gl(1|1) supersymmetric Gaudin magnet with boundary

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