Modon solutions in an N-layer quasi-geostrophic model

IF 3.6 2区 工程技术 Q1 MECHANICS Journal of Fluid Mechanics Pub Date : 2024-09-18 DOI:10.1017/jfm.2024.619
Matthew N. Crowe, Edward R. Johnson
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Abstract

Modons, or dipolar vortices, are common and long-lived features of the upper ocean, consisting of a pair of counter-rotating monopolar vortices moving through self-advection. Such structures remain stable over long times and may be important for fluid transport over large distances. Here, we present a semi-analytical method for finding fully nonlinear modon solutions in a multi-layer quasi-geostrophic model with arbitrarily many layers. Our approach is to reduce the problem to a multi-parameter linear eigenvalue problem which can be solved using numerical techniques from linear algebra. The method is shown to replicate previous results for one- and two-layer models and is applied to a three-layer model to find a solution describing a mid-depth propagating, topographic vortex.
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N 层准地转模型中的模子解法
漩涡(Modons)或双极漩涡是海洋上层常见的长寿特征,由一对通过自平流运动的反向旋转单极漩涡组成。这种结构在很长时间内保持稳定,可能对流体的远距离传输非常重要。在这里,我们提出了一种半分析方法,用于在具有任意多层的多层准地转模型中寻找全非线性模态解。我们的方法是将问题简化为多参数线性特征值问题,利用线性代数中的数值技术求解。结果表明,该方法复制了以前对单层和双层模型的研究结果,并应用于三层模型,找到了描述中深度传播的地形涡旋的解。
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来源期刊
CiteScore
6.50
自引率
27.00%
发文量
945
审稿时长
5.1 months
期刊介绍: Journal of Fluid Mechanics is the leading international journal in the field and is essential reading for all those concerned with developments in fluid mechanics. It publishes authoritative articles covering theoretical, computational and experimental investigations of all aspects of the mechanics of fluids. Each issue contains papers on both the fundamental aspects of fluid mechanics, and their applications to other fields such as aeronautics, astrophysics, biology, chemical and mechanical engineering, hydraulics, meteorology, oceanography, geology, acoustics and combustion.
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