Nonlinear inviscid damping and shear-buoyancy instability in the two-dimensional Boussinesq equations

IF 3.1 1区数学 Q1 MATHEMATICS

Communications on Pure and Applied Mathematics Pub Date : 2023-07-03 DOI:10.1002/cpa.22123

Jacob Bedrossian, Roberta Bianchini, Michele Coti Zelati, Michele Dolce

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引用次数: 14

Abstract

We investigate the long-time properties of the two-dimensional inviscid Boussinesq equations near a stably stratified Couette flow, for an initial Gevrey perturbation of size ε. Under the classical Miles-Howard stability condition on the Richardson number, we prove that the system experiences a shear-buoyancy instability: the density variation and velocity undergo an $O (t^{- 1 / 2})$ inviscid damping while the vorticity and density gradient grow as $O (t^{1 / 2})$ . The result holds at least until the natural, nonlinear timescale $t \approx ε^{- 2}$ . Notice that the density behaves very differently from a passive scalar, as can be seen from the inviscid damping and slower gradient growth. The proof relies on several ingredients: (A) a suitable symmetrization that makes the linear terms amenable to energy methods and takes into account the classical Miles-Howard spectral stability condition; (B) a variation of the Fourier time-dependent energy method introduced for the inviscid, homogeneous Couette flow problem developed on a toy model adapted to the Boussinesq equations, that is, tracking the potential nonlinear echo chains in the symmetrized variables despite the vorticity growth.

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二维Boussinesq方程中的非线性无粘阻尼和剪切浮力不稳定性

我们研究了在稳定分层Couette流附近的二维无粘性Boussinesq方程的长时间性质，对于大小为ε的初始Gevrey扰动。在Richardson数上的经典Miles‐Howard稳定性条件下，我们证明了系统经历剪切浮力不稳定性：密度变化和速度经历O（t−1/2）$O（t^｛-1/2｝）$无粘性阻尼，而涡度和密度梯度随着O（t1/2）$O。该结果至少持续到自然非线性时间尺度t≈ε−2$t\approx\varepsilon^｛-2｝$。请注意，密度的行为与被动标量非常不同，这可以从无粘性阻尼和较慢的梯度增长中看出。证明依赖于几个因素：（A）适当的对称性，使线性项服从能量方法，并考虑经典的Miles‐Howard谱稳定性条件；（B）针对在适用于Boussinesq方程的玩具模型上开发的无粘性齐次Couette流问题，引入了傅立叶时间相关能量方法的一种变体，即跟踪对称变量中的潜在非线性回波链，尽管涡度增长。

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来源期刊

Communications on Pure and Applied Mathematics 数学-数学

CiteScore

6.70

自引率

3.30%

发文量

审稿时长

>12 weeks

期刊介绍： Communications on Pure and Applied Mathematics (ISSN 0010-3640) is published monthly, one volume per year, by John Wiley & Sons, Inc. © 2019. The journal primarily publishes papers originating at or solicited by the Courant Institute of Mathematical Sciences. It features recent developments in applied mathematics, mathematical physics, and mathematical analysis. The topics include partial differential equations, computer science, and applied mathematics. CPAM is devoted to mathematical contributions to the sciences; both theoretical and applied papers, of original or expository type, are included.