Algebraic Bethe ansatz method for the exact calculation of energy spectra and form factors: applications to models of Bose Einstein condensates and metallic nanograins

Links, Jon; Zhou, Huan‐Qiang; McKenzie, Ross H.; Gould, M. D.

doi:10.1088/0305-4470/36/19/201

Cited by 141 publications

(203 citation statements)

References 111 publications

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“…It is an exactly solvable [34,35] many-body interacting quantum system as well as one of the simplest to show a quantum transition in the regime of strong coupling. The quantum phase transition of this model can be described by the symmetry broken mechanism, the two phases are associated with either collective or single-particle behavior.…”

Section: Lmg Model and Global Fidelity Susceptibilitymentioning

confidence: 99%

Many-body reduced fidelity susceptibility in Lipkin-Meshkov-Glick model

Wang

2009

Phys. Rev. E

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We study the reduced fidelity susceptibility χr for an M -body subsystem of an N -body LipkinMeshkov-Glick model with τ = M/N fixed. The reduced fidelity susceptibility can be viewed as the response of subsystem to a certain parameter. In noncritical region, the inner correlation of the system is weak, and χr behaves similar with the global fidelity susceptibility χg, the ratio η = χr/χg depends on τ but not N . However, at the critical point, the inner correlation tends to be divergent, then we find χr approaches χg with the increasing the N , and η = 1 in the thermodynamic limit. The analytical predictions are perfect agreement with the numerical results.

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Section: Lmg Model and Global Fidelity Susceptibilitymentioning

confidence: 99%

Many-body reduced fidelity susceptibility in Lipkin-Meshkov-Glick model

Wang

2009

Phys. Rev. E

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“…This is the homo-atomic-molecular BEC model and has been solved by the ABA method [27]. Specializing the general results in the preceding section to this case, we have…”

Section: Explicit Examples Corresponding To Becsmentioning

confidence: 98%

“…Hamiltonians for the special cases of s = r = 1 and s = 2, r = 1 have also been studied using Algebraic Bethe Ansatz (ABA) method [27]. This paper is organized as follows, in section 2 we propose a class of generalized polynomial su(1, 1) algebras and derive their boson realizations.…”

Section: Introductionmentioning

confidence: 99%

Polynomial algebras and exact solutions of general quantum nonlinear optical models I: two-mode boson systems

Lee¹,

Yang²,

Zhang³

2010

J. Phys. A: Math. Theor.

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We introduce higher order polynomial deformations of A 1 Lie algebra. We construct their unitary representations and the corresponding single-variable differential operator realizations. We then use the results to obtain exact (Bethe ansatz) solutions to a class of 2-mode boson systems, including the Boson-Einstein Condensate models as special cases. Up to an overall factor, the eigenfunctions of the 2-mode boson systems are given by polynomials whose roots are solutions of the associated Bethe ansatz equations. The corresponding eigenvalues are expressed in terms of these roots. We also establish the spectral equivalence between the BEC models and certain quasi-exactly solvable Schördinger potentials.

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“…Using the Lax operator presented above and the co-multiplication property [18], we can obtain a new realization for the monodromy matrix that satisfies the Yang-Baxter equation through…”

Section: General Realization Of Yang-baxter Algebramentioning

confidence: 99%

Quantum integrable multi-well tunneling models

Ymai

Tonel

Foerster

et al. 2017

J. Phys. A: Math. Theor.

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In this work we present a general construction of integrable models for boson tunneling in multi-well systems. We show how the models may be derived through the Quantum Inverse Scattering Method and solved by algebraic Bethe ansatz means. From the transfer matrix we find only two conserved operators. However, we construct additional conserved operators through a different method. As a consequence the models admit multiple pseudovacua, each associated to a set of Bethe ansatz equations. We show that all sets of Bethe ansatz equations are needed to obtain a complete set of eigenstates.

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Algebraic Bethe ansatz method for the exact calculation of energy spectra and form factors: applications to models of Bose Einstein condensates and metallic nanograins

Cited by 141 publications

References 111 publications

Many-body reduced fidelity susceptibility in Lipkin-Meshkov-Glick model

Many-body reduced fidelity susceptibility in Lipkin-Meshkov-Glick model

Polynomial algebras and exact solutions of general quantum nonlinear optical models I: two-mode boson systems

Quantum integrable multi-well tunneling models

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