Coherent spin mixing dynamics in a spin-1 atomic condensate

Zhang, Wenxian; Zhou, D. L.; Chang, M.-S.; Chapman, Michael; You, Li

doi:10.1103/physreva.72.013602

Cited by 182 publications

(138 citation statements)

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“…, and for the m ¼ 0 case that is relevant for these experiments, the spin dynamics are determined by the mean field equivalent to equation 1 21 .…”

Section: Discussionmentioning

confidence: 99%

“…As evolution proceeds, the phase, y s , converges towards the separatrix separating the librational and rotational trajectories, and the population starts to evolve along it. The separatrix has a divergent period 21 , and so the states disperse significantly due to the different evolution rates of nearby energy contours. It is this dispersion, together with the shape of the orbit, that gives rise to the highly non-Gaussian probability distributions.…”

Section: Discussionmentioning

confidence: 99%

“…In this case, the non-trivial dynamical evolution of the system occurs only in the internal spin variables, and the mean-field dynamics of the system can be described by a non-rigid pendulum similar to the two-site Bose-Hubbard model 20,21 . The system is fully integrable in both the quantum 22 and classical 21,23 limits, and provides the opportunity to explore non-equilibrium quantum dynamics that are not captured by mean-field approaches, and can be solved exactly with Schrödinger's equation. The condensate is prepared in a state corresponding to a hyperbolic fixed point in the spin-nematic phase space.…”

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confidence: 99%

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Non-equilibrium dynamics of an unstable quantum pendulum explored in a spin-1 Bose–Einstein condensate

et al. 2012

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A pendulum prepared perfectly inverted and motionless is a prototype of unstable equilibrium and corresponds to an unstable hyperbolic fixed point in the dynamical phase space. Here, we measure the non-equilibrium dynamics of a spin-1 Bose-Einstein condensate initialized as a minimum uncertainty spin-nematic state to a hyperbolic fixed point of the phase space. Quantum fluctuations lead to non-linear spin evolution along a separatrix and non-Gaussian probability distributions that are measured to be in good agreement with exact quantum calculations up to 0.25 s. At longer times, atomic loss due to the finite lifetime of the condensate leads to larger spin oscillation amplitudes, as orbits depart from the separatrix. This demonstrates how decoherence of a many-body system can result in apparent coherent behaviour. This experiment provides new avenues for studying macroscopic spin systems in the quantum limit and for investigations of important topics in non-equilibrium quantum dynamics.

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“…, and for the m ¼ 0 case that is relevant for these experiments, the spin dynamics are determined by the mean field equivalent to equation 1 21 .…”

Section: Discussionmentioning

confidence: 99%

Section: Discussionmentioning

confidence: 99%

mentioning

confidence: 99%

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Non-equilibrium dynamics of an unstable quantum pendulum explored in a spin-1 Bose–Einstein condensate

et al. 2012

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“…T may be expressed as an elliptic integral [18]. Note that forq > 0 the separatrix divides the phase space into two disjoint regions (see Fig.…”

Section: Rotation Angle and Monodromymentioning

confidence: 99%

Spin-1 microcondensate in a magnetic field

Lamacraft

2011

Phys. Rev. A

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We study a spin 1 Bose condensate small enough to be treated as a single magnetic 'domain': a system that we term a microcondensate. Because all particles occupy a single spatial mode, this quantum many body system has a well defined classical limit consisting of three degrees of freedom, corresponding to the three macroscopically occupied spin states. We study both the classical limit and its quantization, finding an integrable system in both cases. Depending on the sign of the ratio of the spin interaction energy and the quadratic Zeeman energy, the classical limit displays either a separartrix in phase space, or Hamiltonian monodromy corresponding to non-trivial phase space topology. We discuss the quantum signatures of these classical phenomena using semiclassical quantization as well as an exact solution using the Bethe ansatz.

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“…F γ=x,y,z are spin-1 matrices. E i denotes the Zeeman shift of an alkali atom in the state |i (the Breit-Rabi formula) [38,39],…”

Section: System Description and Number-conserving Bogoliubov Theorymentioning

confidence: 99%

Magnetic-field-induced dynamical instabilities in an antiferromagnetic spin-1 Bose-Einstein condensate

Zhang

et al. 2016

Phys. Rev. A

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We theoretically investigate four types of dynamical instability, in particular the periodic and oscillatory type IO, in an anti-ferromagnetic spin-1 Bose-Einstein condensate in a nonzero magnetic field, by employing the coupled-mode theory and numerical method. This is in sharp contrast to the dynamical stability of the same system in zero field. Remarkably, a pattern transition from a periodic dynamical instability IO to a uniform one IIIO occurs at a critical magnetic field. All the four types of dynamical instability and the pattern transition are ready to be detected in 23 Na condensates within the availability of the current experimental techniques.

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Coherent spin mixing dynamics in a spin-1 atomic condensate

Cited by 182 publications

References 31 publications

Non-equilibrium dynamics of an unstable quantum pendulum explored in a spin-1 Bose–Einstein condensate

Non-equilibrium dynamics of an unstable quantum pendulum explored in a spin-1 Bose–Einstein condensate

Spin-1 microcondensate in a magnetic field

Magnetic-field-induced dynamical instabilities in an antiferromagnetic spin-1 Bose-Einstein condensate

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