1. Dynamical pattern formation during growth of a dual-species Bose-Einstein condensate
- Author
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Shai Ronen, John L. Bohn, Laura Halmo, and Mark Edwards
- Subjects
Physics ,Condensed Matter::Quantum Gases ,Condensed matter physics ,Component (thermodynamics) ,Condensed Matter::Other ,Pattern formation ,FOS: Physical sciences ,01 natural sciences ,Molecular physics ,Instability ,Atomic and Molecular Physics, and Optics ,010305 fluids & plasmas ,law.invention ,Condensed Matter - Other Condensed Matter ,Gross–Pitaevskii equation ,law ,Phase (matter) ,0103 physical sciences ,010306 general physics ,Ground state ,Bose–Einstein condensate ,Evaporative cooler ,Other Condensed Matter (cond-mat.other) - Abstract
We simulate the growth of a dual species Bose-Einstein condensate using a Gross-Pitaevskii equation with an additional gain term giving rise to the growth. Such growth occurs during simultaneous evaporative cooling of a mixture of two gases. The ground state of a dual condensate is normally either a miscible mixture, or an immiscible phase with two spatially separated components. In a cigar trap the ground state typically consists of one component in the center, and the other component flanking it. Our simulations show that when the condensates are formed in a cigar trap and the mixture is phase separated, then the final state upon the end of the growth is generally far from the true ground state of the system. Instead it consists of multiple, interleaved bubbles of the two species. Such a pattern was observed recently in an experiment by Wieman's group at JILA [Papp, Pino, and Wieman, Phys. Rev. Lett. 101, 040402 (2008)], and our simulations are in good qualitative agreement with the experiment. We explain the pattern formation as due to the onset of modulation instability during growth, and study the dependence of the final state pattern on various parameters of the system.
- Published
- 2008
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