物理
涡流
稀薄(生态学)
脉搏(音乐)
不稳定性
孤子
经典力学
非线性系统
机械
量子力学
生态学
物种多样性
生物
电压
作者
David Feijoo,Ángel Paredes,Humberto Michinel
出处
期刊:Physical review
[American Physical Society]
日期:2017-03-09
卷期号:95 (3): 032208-032208
被引量:6
标识
DOI:10.1103/physreve.95.032208
摘要
We present a numerical study of the cubic-quintic nonlinear Schrödinger equation in two transverse dimensions, relevant for the propagation of light in certain exotic media. A well-known feature of the model is the existence of flat-top bright solitons of fixed intensity, whose dynamics resembles the physics of a liquid. They support traveling wave solutions, consisting of rarefaction pulses and vortex-antivortex pairs. In this work, we demonstrate how the vortex-antivortex pairs can be generated in bright soliton collisions displaying destructive interference followed by a snake instability. We then discuss the collisional dynamics of the dark excitations for different initial conditions. We describe a number of distinct phenomena including vortex exchange modes, quasielastic flyby scattering, solitonlike crossing, fully inelastic collisions, and rarefaction pulse merging.
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