Integrable spin-12 Richardson-Gaudin XYZ models in an arbitrary magnetic field

We establish the most general class of spin- integrable Richardson-Gaudin models including an arbitrary magnetic field, returning a fully anisotropic (XYZ) model. The restriction to spin- relaxes the usual integrability constraints, allowing for a general solution where the couplings between spins l...

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Bibliographic Details
Published in:Journal of physics. A, Mathematical and theoretical Mathematical and theoretical, 2019-01, Vol.52 (8)
Main Authors: Claeys, Pieter W, Dimo, Claude, De Baerdemacker, Stijn, Faribault, Alexandre
Format: Article
Language:English
Subjects:
exactly-solvable models
integrability
Richardson-Gaudin models
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Summary:We establish the most general class of spin- integrable Richardson-Gaudin models including an arbitrary magnetic field, returning a fully anisotropic (XYZ) model. The restriction to spin- relaxes the usual integrability constraints, allowing for a general solution where the couplings between spins lack the usual antisymmetric properties of Richardson-Gaudin models. The full set of conserved charges are constructed explicitly and shown to satisfy a set of quadratic equations, allowing for the numerical treatment of a fully anisotropic central spin in an external magnetic field. While this approach does not provide expressions for the exact eigenstates, it allows their eigenvalues to be obtained, and expectation values of local observables can then be calculated from the Hellmann-Feynman theorem.
ISSN:1751-8113
1751-8121
DOI:10.1088/1751-8121/aafe9b