Dark solitons and rouge waves for a (2+1)-dimensional Gross–Pitaevskii equation with time-varying trapping potential in the Bose–Einstein condensate

A Bose-Einstein condensate of bosons with repulsion, described by the Gross-Pitaevskii equation and restricted by an impenetrable “hard wall” (either rigid or ﬂexible) which is intended to suppress the “snake instability” inherent for dark solitons, is considered. The Bogoliubov-de Gennes equations to find the spectra of gapless Bogoliubov excitations localized near the “domain wall” and therefore split from the bulk excitation spectrum of the Bose-Einstein condensate are solved. The “domain wall” may model either the surface of liquid helium or of a strongly trapped Bose-Einstein condensate. The dispersion relations for the surface excitations are found for all wavenumbers along the surface up to the ”free-particle” behavior , the latter was shown to be bound to the “hard wall” with some “universal” energy .

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Emission of Solitons From an Obstacle Moving in the Bose-Einstein Condensate

Frontiers in Physics ◽

10.3389/fphy.2021.784564 ◽

2021 ◽

Vol 9 ◽

Author(s):

Yu Song ◽

Yu Mo ◽

Shiping Feng ◽

Shi-Jie Yang

Keyword(s):

Numerical Simulations ◽

Einstein Condensate ◽

Pitaevskii Equation ◽

Nonlinear Interactions ◽

One Dimensional ◽

System Parameters ◽

Dark Solitons ◽

Bose Einstein Condensate ◽

Bose Einstein ◽

Moving Obstacle

Dark solitons dynamically generated from a potential moving in a one-dimensional Bose-Einstein condensate are displayed. Based on numerical simulations of the Gross-Pitaevskii equation, we find that the moving obstacle successively emits a series of solitons which propagate at constant speeds. The dependence of soliton emission on the system parameters is examined. The formation mechanism of solitons is interpreted as interference between a diffusing wavepacket and the condensate background, enhanced by the nonlinear interactions.PACS numbers: 03.75.Mn, 03.75.Lm, 05.30.Jp

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PARAMETRIC EXCITATION OF SOLITONS IN DIPOLAR BOSE–EINSTEIN CONDENSATES

Modern Physics Letters B ◽

10.1142/s0217984913501844 ◽

2013 ◽

Vol 27 (25) ◽

pp. 1350184 ◽

Cited By ~ 1

Author(s):

A. BENSEGHIR ◽

W. A. T. WAN ABDULLAH ◽

B. A. UMAROV ◽

B. B. BAIZAKOV

Keyword(s):

Parametric Excitation ◽

Einstein Condensate ◽

Quantum Gases ◽

Variational Approximation ◽

Pitaevskii Equation ◽

Nonlocal Nonlinearity ◽

Bose Einstein Condensate ◽

Atomic Interactions ◽

Theoretical Predictions ◽

Bose Einstein

In this paper, we study the response of a Bose–Einstein condensate with strong dipole–dipole atomic interactions to periodically varying perturbation. The dynamics is governed by the Gross–Pitaevskii equation with additional nonlinear term, corresponding to a nonlocal dipolar interactions. The mathematical model, based on the variational approximation, has been developed and applied to parametric excitation of the condensate due to periodically varying coefficient of nonlocal nonlinearity. The model predicts the waveform of solitons in dipolar condensates and describes their small amplitude dynamics quite accurately. Theoretical predictions are verified by numerical simulations of the nonlocal Gross–Pitaevskii equation and good agreement between them is found. The results can lead to better understanding of the properties of ultra-cold quantum gases, such as 52 Cr , 164 Dy and 168 Er , where the long-range dipolar atomic interactions dominate the usual contact interactions.

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Dynamic vortex evolution of harmonically trapped coupled Bose–Einstein condensate with quintic nonlinearity

International Journal of Modern Physics B ◽

10.1142/s0217979222500114 ◽

2021 ◽

Author(s):

Yunsong Guo ◽

Yubin Jiao ◽

Xiaoning Liu ◽

Xiangbo Zhu ◽

Ying Wang

Keyword(s):

Periodic Breathing ◽

Oscillation Period ◽

Angular Frequency ◽

Equation Model ◽

Einstein Condensate ◽

Pitaevskii Equation ◽

Atomic Systems ◽

Bose Einstein Condensate ◽

Two Component ◽

Bose Einstein

In this study, we investigate the evolution of vortex in harmonically trapped two-component coupled Bose–Einstein condensate with quintic-order nonlinearity. We derive the vortex solution of this two-component system based on the coupled quintic-order Gross–Pitaevskii equation model and the variational method. It is found that the evolution of vortex is a metastable state. The radius of vortex soliton shrinks and expands with time, resulting in periodic breathing oscillation, and the angular frequency of the breathing oscillation is twice the value of the harmonic trapping frequency under infinitesimal nonlinear strength. At the same time, it is also found that the higher-order nonlinear term has a quantitative effect rather than a qualitative impact on the oscillation period. With practical experimental setting, we identify the quasi-stable oscillation of the derived vortex evolution mode and illustrated its features graphically. The theoretical results developed in this work can be used to guide the experimental observation of the vortex phenomenon in ultracold coupled atomic systems with quintic-order nonlinearity.

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Phase separation in spin-orbit-angular-momentum coupling Bose–Einstein condensate systems

Modern Physics Letters B ◽

10.1142/s0217984920502413 ◽

2020 ◽

Vol 34 (23) ◽

pp. 2050241

Author(s):

Jin Xu ◽

Jinbin Li

Keyword(s):

Angular Momentum ◽

Phase Separation ◽

Coupling Strength ◽

Interaction Strength ◽

Einstein Condensate ◽

Three Dimensions ◽

Pitaevskii Equation ◽

Spin Orbit ◽

Bose Einstein Condensate ◽

Bose Einstein

We study the phase separation in three-component spin-orbit-angular-momentum coupled Bose–Einstein condensate with spin-1 in three dimensions. Different types of phase-separation are acquired upon an increase of the coupling strength, magnetic gradient strength, spin-dependent interaction strength and particle number above a critical value. Increasing the value of coupling strength and other related parameters shows distinct behaviors which are produced by repulsion for large strengths of spin-orbit angular-momentum (SOAM) coupling. The present investigation is carried out through a numerical Crank–Nicolson method of the underlying mean-field Gross–Pitaevskii equation.

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DYNAMICS OF BISOLITONIC MATTER WAVES IN A BOSE–EINSTEIN CONDENSATE SUBJECTED TO AN ATOMIC BEAM SPLITTER AND GRAVITY

Modern Physics Letters B ◽

10.1142/s0217984910025243 ◽

2010 ◽

Vol 24 (30) ◽

pp. 2911-2920 ◽

Cited By ~ 1

Author(s):

ALAIN MOÏSE DIKANDÉ ◽

ISAIAH NDIFON NGEK ◽

JOSEPH EBOBENOW

Keyword(s):

Einstein Condensate ◽

Matter Wave ◽

Pitaevskii Equation ◽

Transform Method ◽

Perturbative Approach ◽

Matter Waves ◽

Bose Einstein Condensate ◽

Scattering Transform ◽

Experimental Implementation ◽

Bose Einstein

A theoretical scheme for an experimental implementation involving bisolitonic matter waves from an attractive Bose–Einstein condensate, is considered within the framework of a non-perturbative approach to the associate Gross–Pitaevskii equation. The model consists of a single condensate subjected to an expulsive harmonic potential creating a double-condensate structure, and a gravitational potential that induces atomic exchanges between the two overlapping post condensates. Using a non-isospectral scattering transform method, exact expressions for the bright-matter–wave bisolitons are found in terms of double-lump envelopes with the co-propagating pulses displaying more or less pronounced differences in their widths and tails depending on the mass of atoms composing the condensate.

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Creation and evolution of trains of dark solitons in a trapped one-dimensional Bose-Einstein condensate

Physical Review A ◽

10.1103/physreva.68.043614 ◽

2003 ◽

Vol 68 (4) ◽

Cited By ~ 25

Author(s):

V. A. Brazhnyi ◽

A. M. Kamchatnov

Keyword(s):

Einstein Condensate ◽

One Dimensional ◽

Dark Solitons ◽

Bose Einstein Condensate ◽

Bose Einstein

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NEW INSIGHT ON THE CHAIN STATES AND BOSE-EINSTEIN CONDENSATE IN LIGHT NUCLEI

International Journal of Modern Physics E ◽

10.1142/s0218301308011252 ◽

2008 ◽

Vol 17 (10) ◽

pp. 2150-2154 ◽

Cited By ~ 1

Author(s):

S. YU. TORILOV ◽

K. A. GRIDNEV ◽

W. GREINER

Keyword(s):

Cluster Model ◽

Einstein Condensate ◽

Light Nuclei ◽

Einstein Condensation ◽

Pitaevskii Equation ◽

Deformed Nuclei ◽

Bose Einstein Condensation ◽

Bose Einstein Condensate ◽

Alpha Cluster ◽

Bose Einstein

The simple alpha-cluster model was used for the consideration of the chain states and Bose-Einstein condensation in the light self-conjugated nuclei. Obtained results were compared with predictions of the shell-model for the deformed nuclei, with calculations based on Gross-Pitaevskii equation and with recent experimental results.

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