Статья

Shortcut to adiabaticity for an interacting Bose-Einstein condensate

Jean-François SchaffUniversité de Nice-Sophia Antipolis, Institut Non Linéaire de Nice, CNRS - 1361 route des Lucioles, F-06560 Valbonne, France, EUXiao-Li SongUniversité de Nice-Sophia Antipolis, Institut Non Linéaire de Nice, CNRS - 1361 route des Lucioles, F-06560 Valbonne, France, EUP. CapuzziUniversidad de Buenos Aires, FCEN, Departamento de Fisica and Instituto de Fisica de Buenos Aires, CONICET - Ciudad Universitaria, Pab. I C1428EGA Buenos Aires, ArgentinaPatrizia VignoloUniversité de Nice-Sophia Antipolis, Institut Non Linéaire de Nice, CNRS - 1361 route des Lucioles, F-06560 Valbonne, France, EUG. LabeyrieUniversité de Nice-Sophia Antipolis, Institut Non Linéaire de Nice, CNRS - 1361 route des Lucioles, F-06560 Valbonne, France, EU

2011en

ABI

Аннотация

We present an investigation of the fast decompression of a three-dimensional (3D) Bose-Einstein condensate (BEC) at finite temperature using an engineered trajectory for the harmonic trapping potential. Taking advantage of the scaling invariance properties of the time-dependent Gross-Pitaevskii equation, we exhibit a solution yielding a final state identical to that obtained through a perfectly adiabatic transformation, in a much shorter time. Experimentally, we perform a large trap decompression and displacement within a time comparable to the final radial trapping period. By simultaneously monitoring the BEC and the non-condensed fraction, we demonstrate that our specific trap trajectory is valid both for a quantum interacting many-body system and a classical ensemble of non-interacting particles. Copyright © EPLA, 2011.

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Идентификаторы

DOI: 10.1209/0295-5075/93/23001

Цитирования и источники

Цитирований: 3Использованных источников: 0

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