具有自旋轨道耦合的自旋-1 玻色-爱因斯坦凝聚体中的矢量无赖波

Jun-Tao He, Hui-Jun Li, Ji Lin, Boris A. Malomed
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引用次数: 0

摘要

利用多尺度扰动方法,我们得到了有效质量为正和负的流氓波的近似解析解,这些有效质量是由系统的有效色散决定的。这些解包括具有平滑和条纹形状的 RW 以及高阶 RW。分析解表明,系统三个组成部分中的 RW 表现出不同的速度,其最大峰值出现在相同的时空位置,这是 SOC 和相互作用造成的。通过与基础系统的直接数值模拟进行比较,我们证实了近似解析解的准确性。此外,我们还系统地探索了由基带调制不稳定性(BMI)决定的 RW 存在域。数值模拟证实,在 BMI 的作用下,具有随机初始扰动的平面波会激发 RW,正如近似解析解所预测的那样。
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Vector rogue waves in spin-1 Bose-Einstein condensates with spin-orbit coupling
We analytically and numerically study three-component rogue waves (RWs) in spin-1 Bose-Einstein condensates with Raman-induced spin-orbit coupling (SOC). Using the multiscale perturbative method, we obtain approximate analytical solutions for RWs with positive and negative effective masses, determined by the effective dispersion of the system. The solutions include RWs with smooth and striped shapes, as well as higher-order RWs. The analytical solutions demonstrate that the RWs in the three components of the system exhibit different velocities and their maximum peaks appear at the same spatiotemporal position, which is caused by SOC and interactions. The accuracy of the approximate analytical solutions is corroborated by comparison with direct numerical simulations of the underlying system. Additionally, we systematically explore existence domains for the RWs determined by the baseband modulational instability (BMI). Numerical simulations corroborate that, under the action of BMI, plane waves with random initial perturbations excite RWs, as predicted by the approximate analytical solutions.
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