Nonlinear spatial evolution of degenerate quartets of water waves

IF 2.1 3区 物理与天体物理 Q2 ACOUSTICS
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引用次数: 0

Abstract

In this manuscript we investigate the Benjamin–Feir (or modulation) instability for the spatial evolution of water waves from the perspective of the discrete, spatial Zakharov equation, which captures cubically nonlinear and resonant wave interactions in deep water without restrictions on spectral bandwidth. Spatial evolution, with measurements at discrete locations, is pertinent for laboratory hydrodynamic experiments, such as in wave flumes, which rely on time-series measurements at fixed gauges installed along the facility. This setting is likewise appropriate for experiments in electromagnetic and plasma waves. Through a reformulation of the problem for a degenerate quartet, we bring to bear techniques of phase-plane analysis which elucidate the full dynamics without recourse to linear stability analysis. In particular we find hitherto unexplored breather solutions and discuss the optimal transfer of energy from carrier to sidebands. We show that the maximal energy transfer consistently occurs for smaller side-band separation than the fastest linear growth rate. Finally, we discuss the observability of such discrete solutions in light of numerical simulations.

退化四元水波的非线性空间演化
在本手稿中,我们从离散空间扎哈罗夫方程的角度研究了水波空间演化的本杰明-菲尔(或调制)不稳定性,该方程捕捉了深水中的立方非线性和共振波相互作用,对频谱带宽没有限制。在离散位置进行测量的空间演化适用于实验室水动力实验,例如在波浪槽中进行的实验,这些实验依赖于在沿设施安装的固定测量仪上进行时间序列测量。这种设置同样适用于电磁波和等离子体波实验。通过对退化四元组问题的重新表述,我们采用了相平面分析技术,无需求助于线性稳定性分析即可阐明整个动力学过程。特别是,我们发现了迄今为止尚未探索过的呼吸解,并讨论了从载流子到边带的最佳能量转移。我们发现,在边带分离度小于最快线性增长率的情况下,最大能量转移始终存在。最后,我们根据数值模拟讨论了这种离散解的可观测性。
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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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