2021
DOI: 10.1103/physreva.103.042209
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Exact variational dynamics of the multimode Bose-Hubbard model based on SU(M) coherent states

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Cited by 8 publications
(11 citation statements)
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“…More insights into the features of the model can be gained from its semiclassical counterpart, which is given by the expectation value of H in equation (1) with respect to the coherent state in the limit N → ∞. The coherent states are defined as [68,81,[88][89][90]…”
Section: Semiclassical Limitmentioning
confidence: 99%
See 1 more Smart Citation
“…More insights into the features of the model can be gained from its semiclassical counterpart, which is given by the expectation value of H in equation (1) with respect to the coherent state in the limit N → ∞. The coherent states are defined as [68,81,[88][89][90]…”
Section: Semiclassical Limitmentioning
confidence: 99%
“…where |N, N 0 〉 are the Fock states and j = f 0 − (f 1 + f −1 )/2 is the relative phase. By using the relation [81,90], one can easily find that the semiclassical limit of H (1) is given by [81,88] a a…”
Section: Semiclassical Limitmentioning
confidence: 99%
“…More insights into the properties of the system and associated phase transitions can be gained from the semiclassical analysis in the limit N → ∞. To this end, we calculate the semiclassical counterpart of the Hamiltonian (1) by using the coherent states, defined as [58,71,[77][78][79]…”
Section: Semiclassical Limitmentioning
confidence: 99%
“…( 1) with respect to the coherent state in the classical limit N → ∞. By employing the relation α|a † m a m ′ |α = N α * m α m ′ [71,79], one can easily find that the classical Hamiltonian with N 1 = N −1 (n −1 = n 1 ) reads [71,77]…”
Section: Semiclassical Limitmentioning
confidence: 99%
“…ZSs can be viewed as Fermionic Coherent States (CS) of a two-level system. Previously Coherent States of the harmonic oscillator have been used to describe Bosonic systems in second quantisation with the help of Herman-Kluck 17 and Coupled Coherent States propagation methods 18 and also with Generalised Coherent States 19 . Second quantisation Hamiltonians look like those of coupled oscillators with the difference that the oscillators represent the amplitudes and populations of the orbitals occupied by Bosons.…”
Section: Introductionmentioning
confidence: 99%