Elastic and inelastic collisions of<mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" display="inline"><mml:mrow><mml:msup><mml:mrow /><mml:mrow><mml:mn>6</mml:mn></mml:mrow></mml:msup></mml:mrow><mml:mi mathvariant="normal">Li</mml:mi></mml:math>atoms in magnetic and optical traps

Houbiers, M.; Stoof, H. T. C.; McAlexander, W. I.; Hulet, R. G.

doi:10.1103/physreva.57.r1497

Cited by 139 publications

(171 citation statements)

References 13 publications

(20 reference statements)

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“…For the broad Feshbach resonance in the 6 Li system the molecule state belongs to a singlet of the electron spin, resulting in µ M ≈ 0. The microscopic value ofμ = ∂ν Λ /∂B obtains its essential contribution from the magnetic moment of the atoms in the open channel, which is well approximated [58] by the Bohr magneton µ B = 5.788 · 10 −11 MeV/T = 0.2963MeV −1 . For 40 K we takeμ = 1.57µ B [59].…”

Section: B Yukawa Couplingmentioning

confidence: 99%

Universality in phase transitions for ultracold fermionic atoms

2006

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We describe the gas of ultracold fermionic atoms by a functional integral for atom and molecule fields. The crossover from Bose-Einstein condensation (BEC) to BCS-type superfluidity shows universal features in terms of a concentration parameter for the ratio between scattering length and average interatomic distance. We discuss the relevance of the Yukawa coupling between atoms and molecules, establish an exact narrow resonance limit and show that renormalized quantities are independent of the Yukawa coupling for the broad resonance, BCS and BEC limits. Within our functional integral formalism we compute the atom scattering in vacuum and the molecular binding energy. This connects the universal concentration parameter to the magnetic field of a given experiment. Beyond mean field theory we include the fluctuations of the molecule field and the renormalization effects for the atom-molecule coupling. We find excellent agreement with the observed fraction of bare molecules in 6 Li and qualitative agreement with the condensate fraction in 6 Li and 40 K. In addition to the phase diagram and condensate fraction we compute the correlation length for molecules, the in-medium scattering length for molecules and atoms and the sound velocity.

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Section: B Yukawa Couplingmentioning

confidence: 99%

Universality in phase transitions for ultracold fermionic atoms

2006

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“…This has lead to the development of models that require minimal knowledge of the molecular potentials (see, e.g., [33][34][35][36]) at the expense of accuracy and applicability. A powerful, yet computationally light description of the near-threshold molecular spectrum is the ABM [13,14].…”

Section: B Asymptotic-bound-state Modelmentioning

confidence: 99%

Feshbach spectroscopy and analysis of the interaction potentials of ultracold sodium

et al. 2011

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We have studied magnetic Feshbach resonances in an ultracold sample of Na prepared in the absolute hyperfine ground state. We report on the observation of three s-, eight d-, and three g-wave Feshbach resonances, including a more precise determination of two known s-wave resonances, and one s-wave resonance at a magnetic field exceeding 200 mT. Using a coupled-channels calculation we have improved the sodium ground-state potentials by taking into account these new experimental data and derived values for the scattering lengths. In addition, a description of the molecular states leading to the Feshbach resonances in terms of the asymptotic-bound-state model is presented.

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“…In a realistic case, we can consider 10 8 fermions in an isotropic magnetic trap with ω/2π = 100 Hz (T F = 4 µK, r F = 0.17 mm). The density of the fermionic gas is 5 10 12 cm −3 , giving a mean field energy created by the Fermi cloud on P equal to 10 nK [21,22], which is negligible with respect to E F , as assumed in this paper.…”

mentioning

confidence: 99%

Collisional relaxation in a fermionic gas

Ferrari

1999

Phys. Rev. A

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We propose a method to study the degeneracy of a trapped atomic gas of fermions through the relaxation of the motion of a test particle. In the degenerate regime, and for an energy of the test particle well below the Fermi energy, we show that the Fermi-Dirac statistics is responsible for a strong decrease of the relaxation rate. This method can be used to directly measure the temperature of the fermionic gas.

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Elastic and inelastic collisions of6Liatoms in magnetic and optical traps

Cited by 139 publications

References 13 publications

Universality in phase transitions for ultracold fermionic atoms

Universality in phase transitions for ultracold fermionic atoms

Feshbach spectroscopy and analysis of the interaction potentials of ultracold sodium

Collisional relaxation in a fermionic gas

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