单调剪切流附近的非线性无粘阻尼

IF 5.4 3区 材料科学 Q2 CHEMISTRY, PHYSICAL ACS Applied Energy Materials Pub Date : 2020-01-09 DOI:10.4310/acta.2023.v230.n2.a2
A. Ionescu, H. Jia
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引用次数: 40

摘要

在通道$\mathbb{T}\乘以[0,1]$中,证明了一类二维欧拉方程解之间的单调剪切流的非线性渐近稳定性。更准确地说,我们考虑剪切流$(b(y),0)$由一个函数$b$给出,该函数$b$在区间$(0,1)$的紧子集外是Gevrey光滑的、严格递增的和线性的(以避免边界贡献与无粘阻尼不相容)。我们还假设相关的线性化算子满足一个合适的谱条件,这是证明线性无粘阻尼所必需的。在这些假设下,我们证明了如果$u$是这样一个剪切流$(b(y),0)$在时间$t=0$时的一个小的和Gevrey光滑扰动的解,那么速度场$u$随着时间趋于无穷强收敛到附近的剪切流$u$。这是欧拉方程在一般稳定解周围的第一个非线性渐近稳定性结果,其线性化流动不能显式求解。
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Nonlinear inviscid damping near monotonic shear flows
We prove nonlinear asymptotic stability of a large class of monotonic shear flows among solutions of the 2D Euler equations in the channel $\mathbb{T}\times[0,1]$. More precisely, we consider shear flows $(b(y),0)$ given by a function $b$ which is Gevrey smooth, strictly increasing, and linear outside a compact subset of the interval $(0,1)$ (to avoid boundary contributions which are incompatible with inviscid damping). We also assume that the associated linearized operator satisfies a suitable spectral condition, which is needed to prove linear inviscid damping. Under these assumptions, we show that if $u$ is a solution which is a small and Gevrey smooth perturbation of such a shear flow $(b(y),0)$ at time $t=0$, then the velocity field $u$ converges strongly to a nearby shear flow as the time goes to infinity. This is the first nonlinear asymptotic stability result for Euler equations around general steady solutions for which the linearized flow cannot be explicitly solved.
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来源期刊
ACS Applied Energy Materials
ACS Applied Energy Materials Materials Science-Materials Chemistry
CiteScore
10.30
自引率
6.20%
发文量
1368
期刊介绍: ACS Applied Energy Materials is an interdisciplinary journal publishing original research covering all aspects of materials, engineering, chemistry, physics and biology relevant to energy conversion and storage. The journal is devoted to reports of new and original experimental and theoretical research of an applied nature that integrate knowledge in the areas of materials, engineering, physics, bioscience, and chemistry into important energy applications.
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