二维截断欧拉流的几何微正则理论

A. V. Kan, A. Alexakis, M. Brachet
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引用次数: 6

摘要

本文提出了二维截断欧拉流的几何微正则系综观点,该流包含有限数量的(傅里叶)模态,并且保存能量和熵。我们明确地在恒定能量和熵的壳层上进行相空间体积积分。考虑两个应用程序。在第一部分中,我们确定了高凝聚流动构型的平均能谱,并证明了结果与Kraichnan的正则系综描述是一致的,尽管没有调用热力学极限。在第二部分中,我们计算了方形中显示反转的自由滑移流的最大尺度模态的概率密度。我们对最小模型的数值模拟结果进行了测试,发现与微正则理论非常一致,不像正则理论,它不能描述双峰统计量。本文是主题问题“物理流体动力学中的数学问题(第二部分)”的一部分。
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Geometric microcanonical theory of two-dimensional truncated Euler flows
This paper presents a geometric microcanonical ensemble perspective on two-dimensional truncated Euler flows, which contain a finite number of (Fourier) modes and conserve energy and enstrophy. We explicitly perform phase space volume integrals over shells of constant energy and enstrophy. Two applications are considered. In the first part, we determine the average energy spectrum for highly condensed flow configurations and show that the result is consistent with Kraichnan’s canonical ensemble description, despite the fact that no thermodynamic limit is invoked. In the second part, we compute the probability density for the largest-scale mode of a free-slip flow in a square, which displays reversals. We test the results against numerical simulations of a minimal model and find excellent agreement with the microcanonical theory, unlike the canonical theory, which fails to describe the bimodal statistics. This article is part of the theme issue ‘Mathematical problems in physical fluid dynamics (part 2)’.
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