Well-Posedness for Ohkitani Model and Long-Time Existence for Surface Quasi-geostrophic Equations

IF 2.2 1区物理与天体物理 Q1 PHYSICS, MATHEMATICAL

Communications in Mathematical Physics Pub Date : 2025-03-05 DOI:10.1007/s00220-025-05257-x

Dongho Chae, In-Jee Jeong, Jungkyoung Na, Sung-Jin Oh

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引用次数: 0

Abstract

We consider the Cauchy problem for the logarithmically singular surface quasi-geostrophic (SQG) equation, introduced by Ohkitani,

$$\begin{aligned} \begin{aligned} \partial _t \theta - \nabla ^\perp \log (10+(-\Delta )^{\frac{1}{2}})\theta \cdot \nabla \theta = 0, \end{aligned} \end{aligned}$$

and establish local existence and uniqueness of smooth solutions in the scale of Sobolev spaces with exponent decreasing with time. Such a decrease of the Sobolev exponent is necessary, as we have shown in the companion paper (Chae et al. in Illposedness via degenerate dispersion for generalized surface quasi-geostrophic equations with singular velocities, arXiv:2308.02120) that the problem is strongly ill-posed in any fixed Sobolev spaces. The time dependence of the Sobolev exponent can be removed when there is a dissipation term strictly stronger than log. These results improve wellposedness statements by Chae et al. (Comm Pure Appl Math 65(8):1037–1066, 2012). This well-posedness result can be applied to describe the long-time dynamics of the $\delta $-SQG equations, defined by

$$\begin{aligned} \begin{aligned} \partial _t \theta + \nabla ^\perp (10+(-\Delta )^{\frac{1}{2}})^{-\delta }\theta \cdot \nabla \theta = 0, \end{aligned} \end{aligned}$$

for all sufficiently small $\delta >0$ depending on the size of the initial data. For the same range of $\delta $, we establish global well-posedness of smooth solutions to the dissipative SQG equations.

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Ohkitani模型的适定性和表面准地转方程的长时间存在性

我们考虑由 Ohkitani 引入的对数奇异曲面准地转方程（SQG）的 Cauchy 问题，$$\begin{aligned}（$$\begin{aligned}）。\开始\Partial _t \theta - \nabla ^\perp \log (10+(-\Delta )^{frac{1}{2}})\theta \cdot \nabla \theta = 0, （end{aligned}）\end{aligned}$$ 并建立了指数随时间递减的 Sobolev 空间尺度中光滑解的局部存在性和唯一性。Sobolev 指数的这种下降是必要的，因为我们已经在相关论文（Chae et al. in Illposedness via degenerate dispersion for generalized surface quasi-geostrophic equations with singular velocities, arXiv:2308.02120）中证明，该问题在任何固定的 Sobolev 空间中都是强条件不良的。当存在一个严格强于对数的耗散项时，Sobolev 指数的时间依赖性可以消除。这些结果改进了 Chae 等人（Comm Pure Appl Math 65(8)：1037-1066, 2012）提出的拟合性声明。这一好拟结果可用于描述由 $$\begin{aligned} 定义的 $\delta $-SQG 方程的长时动力学。\开始$10+(-\Delta )^{frac{1}{2})^{-\delta }\theta = 0, end{aligned}\end{aligned}$$ 对于所有足够小的（\delta >0\），取决于初始数据的大小。对于相同范围的 \(\delta $，我们建立了耗散 SQG 方程光滑解的全局拟合性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Communications in Mathematical Physics 物理-物理：数学物理

CiteScore

4.70

自引率

8.30%

发文量

226

审稿时长

3-6 weeks

期刊介绍： The mission of Communications in Mathematical Physics is to offer a high forum for works which are motivated by the vision and the challenges of modern physics and which at the same time meet the highest mathematical standards.