流体静力学近似的三个极限

Ken Furukawa, Yoshikazu Giga, Matthias Hieber, Amru Hussein, Takahito Kashiwabara, Marc Wrona
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引用次数: 0

摘要

原始方程是通过流体静力学近似从 3D$ 纳维尔-斯托克斯方程导出的。形式上,假设有一个 $\varepsilon$ 薄的域和各向异性的粘度,垂直粘度为$\nu_z=\mathcal{O}(\varepsilon^\gamma)$(其中$\gamma=2$),那么当 $\varepsilon\ 到 0$ 时,我们就得到了具有全粘度的原始方程。在这里,我们还要考虑两个极限方程:对于 $\gamma2$ ,当 $\varepsilon\to 0$ 时,原始方程只有水平粘度 $-\Delta_H$。因此,静力学近似有三种可能的极限,取决于对垂直粘度的假设。最近,Li、Titi 和 Yuan 利用能量估计证明了后一种收敛性。在这里,我们更广泛地考虑了 $\nu_z=\varepsilon^2 \delta$,并展示了最大正则方法和二次不等式是如何有效地实现 $\varepsilon,\delta\to 0$ 的。我们方法的灵活性还体现在$\delta\to \infty$和$\varepsilon\to0$对2D$-Navier-Stokes方程的收敛性上。
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The three limits of the hydrostatic approximation
The primitive equations are derived from the $3D$-Navier-Stokes equations by the hydrostatic approximation. Formally, assuming an $\varepsilon$-thin domain and anisotropic viscosities with vertical viscosity $\nu_z=\mathcal{O}(\varepsilon^\gamma)$ where $\gamma=2$, one obtains the primitive equations with full viscosity as $\varepsilon\to 0$. Here, we take two more limit equations into consideration: For $\gamma<2$ the $2D$-Navier-Stokes equations are obtained. For $\gamma>2$ the primitive equations with only horizontal viscosity $-\Delta_H$ as $\varepsilon\to 0$. Thus, there are three possible limits of the hydrostatic approximation depending on the assumption on the vertical viscosity. The latter convergence has been proven recently by Li, Titi, and Yuan using energy estimates. Here, we consider more generally $\nu_z=\varepsilon^2 \delta$ and show how maximal regularity methods and quadratic inequalities can be an efficient approach to the same end for $\varepsilon,\delta\to 0$. The flexibility of our methods is also illustrated by the convergence for $\delta\to \infty$ and $\varepsilon\to 0$ to the $2D$-Navier-Stokes equations.
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