三次涡旋Whitham方程中的波动演化

IF 2.1 3区物理与天体物理 Q2 ACOUSTICS

Wave Motion Pub Date : 2024-12-26 DOI:10.1016/j.wavemoti.2024.103485

Marcelo V. Flamarion , Efim Pelinovsky

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引用次数: 0

摘要

在这项工作中，我们研究了三次涡旋惠瑟姆（cv -惠瑟姆）方程框架内的扰动演化，考虑了正的和负的三次非线性。该方程对描述剪切流存在时的波动过程具有重要作用。我们发现形成良好的呼吸型结构是由具有正三次非线性的凹陷扰动演化而来的。对于高程扰动，结果是双重的。当三次非线性为负时，我们发现CV-Whitham方程和Gardner方程在性质上是相似的，只是由于色散项的不同而产生了一个小的相位滞后。然而，对于正三次非线性，解之间的差异变得更加明显，CV-Whitham方程产生更尖锐的波，表明波浪破碎的开始。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Wave evolution within the Cubic Vortical Whitham equation

In this work, we study the evolution of disturbances within the framework of the Cubic Vortical Whitham (CV-Whitham) equation, considering both positive and negative cubic nonlinearities. This equation plays important role for description of the wave processes in the presence of shear flows. We find well-formed breather-type structures arising from the evolution of depression disturbances with positive cubic nonlinearity. For elevation disturbances, the results are two-fold. When the cubic nonlinearity is negative, we show that the CV-Whitham equation and the Gardner equation are qualitatively similar, differing only by a small phase lag due to differences in the dispersion term. However, with positive cubic nonlinearity, the differences between the solutions become more pronounced, with the CV-Whitham equation producing sharper waves that suggest the onset of wave breaking.

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来源期刊

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.