色散关系
色散(光学)
物理
非线性系统
极限(数学)
非线性薛定谔方程
波数
傅里叶变换
数学分析
畸形波
动作(物理)
傅里叶分析
数学
量子力学
作者
Katelyn Plaisier Leisman,Douglas Zhou,Jeffrey W. Banks,Gregor Kovačič,David Cai
出处
期刊:Physical review
[American Physical Society]
日期:2019-08-19
卷期号:100 (2): 022215-022215
被引量:10
标识
DOI:10.1103/physreve.100.022215
摘要
For waves described by the focusing nonlinear Schrödinger equation (FNLS), we present an effective dispersion relation (EDR) that arises dynamically from the interplay between the linear dispersion and the nonlinearity. The form of this EDR is parabolic for a robust family of "generic" FNLS waves and equals the linear dispersion relation less twice the total wave action of the wave in question multiplied by the square of the nonlinearity parameter. We derive an approximate form of this EDR explicitly in the limit of small nonlinearity and confirm it using the wave-number-frequency spectral (WFS) analysis, a Fourier-transform based method used for determining dispersion relations of observed waves. We also show that it extends to the FNLS the universal EDR formula for the defocusing Majda-McLaughlin-Tabak (MMT) model of weak turbulence. In addition, unexpectedly, even for some spatially periodic versions of multisolitonlike waves, the EDR is still a downward shifted linear-dispersion parabola, but the shift does not have a clear relation to the total wave action. Using WFS analysis and heuristic derivations, we present examples of parabolic and nonparabolic EDRs for FNLS waves and also waves for which no EDR exists.
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