具有三次-五次非线性的分数介质中的二维基底孤子和涡旋孤子的运动动力学

IF 2.1 3区 物理与天体物理 Q2 ACOUSTICS Wave Motion Pub Date : 2024-03-01 DOI:10.1016/j.wavemoti.2024.103306
T. Mayteevarunyoo , B.A. Malomed
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引用次数: 0

摘要

我们报告了对具有三次-五次非线性的分数非线性薛定谔方程(FNLSE)所产生的移动二维(2D)孤子的动力学特征进行系统研究的结果。由于分数衍射打破了底层方程的伽利略不变性,因此孤子运动是一个非难解决的问题。为了稳定孤子,防止其坍缩,有必要在聚焦的三次方项中加入散焦的五次方项。这里提出的设置可以在非线性光学波导中模拟分数衍射来实现。通过系统考虑,确定了移动基底孤子和涡旋孤子(涡度分别为 0 和 1 或 2)的参数,以及稳定孤子持续存在的最大速度,以及决定基础模型分数性的莱维指数特征值。此外,还确定了运动方向相反的二维孤子之间的碰撞结果。这些结果包括孤子合并、准弹性碰撞或破坏性碰撞,以及两个碰撞孤子分裂成四个次级孤子。
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Motion dynamics of two-dimensional fundamental and vortex solitons in the fractional medium with the cubic-quintic nonlinearity

We report results of systematic investigation of dynamics featured by moving two-dimensional (2D) solitons generated by the fractional nonlinear Schrödinger equation (FNLSE) with the cubic-quintic nonlinearity. The motion of solitons is a nontrivial problem, as the fractional diffraction breaks the Galilean invariance of the underlying equation. The addition of the defocusing quintic term to the focusing cubic one is necessary to stabilize the solitons against the collapse. The setting presented here can be implemented in nonlinear optical waveguides emulating the fractional diffraction. Systematic consideration identifies parameters of moving fundamental and vortex solitons (with vorticities 0 and 1 or 2, respectively) and maximum velocities up to which stable solitons persist, for characteristic values of the Lévy index which determines the fractionality of the underlying model. Outcomes of collisions between 2D solitons moving in opposite directions are identified too. These are merger of the solitons, quasi-elastic or destructive collisions, and breakup of the two colliding solitons into a quartet of secondary ones.

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来源期刊
Wave Motion
Wave Motion 物理-力学
CiteScore
4.10
自引率
8.30%
发文量
118
审稿时长
3 months
期刊介绍: Wave Motion is devoted to the cross fertilization of ideas, and to stimulating interaction between workers in various research areas in which wave propagation phenomena play a dominant role. The description and analysis of wave propagation phenomena provides a unifying thread connecting diverse areas of engineering and the physical sciences such as acoustics, optics, geophysics, seismology, electromagnetic theory, solid and fluid mechanics. The journal publishes papers on analytical, numerical and experimental methods. Papers that address fundamentally new topics in wave phenomena or develop wave propagation methods for solving direct and inverse problems are of interest to the journal.
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