Tomasz Świsłocki scite author profile

We consider a phase transition from an antiferromagnetic to a phase separated ground state in a spin-1 Bose-Einstein condensate of ultracold atoms. We demonstrate the occurrence of two scaling laws, for the number of spin domain seeds just after the phase transition, and for the number of spin domains in the final, stable configuration. Only the first scaling can be explained by the standard Kibble-Żurek mechanism. We explain the occurrence of two scaling laws by a model including postselection of spin domains due to the conservation of condensate magnetization.

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Dynamics of the modified Kibble-Żurek mechanism in antiferromagnetic spin-1 condensates

Witkowska

Dziarmaga

Świsłocki

et al. 2013

Phys. Rev. B

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We investigate the dynamics and outcome of a quantum phase transition from an antiferromagnetic to phase separated ground state in a spin-1 Bose-Einstein condensate of ultracold atoms. We explicitly demonstrate double universality in dynamics within experiments with various quench time. Furthermore, we show that spin domains created in the nonequilibrium transition constitute a set of mutually incoherent quasicondensates. The quasicondensates appear to be positioned in a semiregular fashion, which is a result of the conservation of local magnetization during the post-selection dynamics.

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Tunable dipolar resonances and Einstein-de Haas effect in aRb87-atom condensate

et al. 2011

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We theoretically study a spinor condensate of 87 Rb atoms in a F = 1 hyperfine state confined in an optical dipole trap. Putting initially all atoms in an m F = 1, component we observe a significant transfer of atoms to other, initially empty Zeeman states exclusively due to dipolar forces. Because of conservation of a total angular momentum the atoms going to other Zeeman components acquire an orbital angular momentum and circulate around the center of the trap. This is a realization of the Einstein-de Haas effect in a system of cold gases. We show that the transfer of atoms via dipolar interactions is possible only when the energies of the initial and the final sates are equal. This condition can be fulfilled utilizing a resonant external magnetic field, which tunes energies of involved states via the linear Zeeman effect. We found that there are many final states of different spatial density, which can be tuned selectively to the initial state. We show a simple model explaining high selectivity and controllability of weak dipolar interactions in the condensate of 87 Rb atoms.

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Spinor condensate ofRb87as a dipolar gas

Świsłocki¹,

Brewczyk²,

Gajda³

et al. 2010

Phys. Rev. A

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We consider a spinor condensate of 87 Rb atoms in the F = 1 hyperfine state confined in an optical dipole trap. Putting initially all atoms in the m F = 0 component, we find that the system evolves toward a state of thermal equilibrium with kinetic energy equally distributed among all magnetic components. We show that this process is dominated by the dipolar interaction of magnetic spins rather than spin-mixing contact potential. Our results show that because of a dynamical separation of magnetic components, the spin-mixing dynamics in the 87 Rb condensate is governed by the dipolar interaction which plays no role in a single-component rubidium system in a magnetic trap. PACS number(s): 03.75. Mn, 05.30.Jp, 75.45.+j, 75.50.Mm † i (r)BF ijˆ j (r)

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Resonant dynamics of chromium condensates

et al. 2014

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We numerically study the dynamics of a spinor chromium condensate in low magnetic fields. We show that the condensate evolution has a resonant character revealing rich structure of resonances similar to that already discussed in the case of alkali-atoms condensates. This indicates that dipolar resonances occur commonly in the systems of cold atoms. In fact, they have been already observed experimentally. We further simulate two recent experiments with chromium condensates, in which the threshold in spin relaxation and the spontaneous demagnetization phenomena were observed. We demonstrate that both these effects originate in resonant dynamics of chromium condensate.Comment: 8 pages, 9 figure

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