对称随机 p-Stokes 系统的时间规律性

IF 1.2 3区数学 Q2 MATHEMATICS, APPLIED Journal of Mathematical Fluid Mechanics Pub Date : 2024-02-21 DOI:10.1007/s00021-024-00852-9

Jörn Wichmann

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引用次数: 0

摘要

我们研究了有界域中的对称随机 p-Stokes 系统（p \in (1,\infty )\ ）。结果有两个方面：首先，我们证明了在解析弱解的情况下，与无发散随机力相关的随机压力在贝索夫尺度上具有几乎（-1/2）的时间导数。其次，我们验证了强解的速度 u 服从指数尼克尔斯基空间的 1/2 时间导数。此外，我们证明了非线性对称梯度（V(\mathbb {\epsilon } u) = (\kappa + \left| \mathbb {\epsilon } u\right| )^{(p-2)/2} \mathbb {\epsilon } u\)、\(\kappa \ge 0\) 测量 p-Stokes 系统的椭圆度，在 Nikolskii 空间有 1/2 的时间导数。

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Temporal Regularity of Symmetric Stochastic p-Stokes Systems

We study the symmetric stochastic p-Stokes system, \(p \in (1,\infty )\), in a bounded domain. The results are two-fold: First, we show that in the context of analytically weak solutions, the stochastic pressure—related to non-divergence free stochastic forces—enjoys almost \(-1/2\) temporal derivatives on a Besov scale. Second, we verify that the velocity u of strong solutions obeys 1/2 temporal derivatives in an exponential Nikolskii space. Moreover, we prove that the non-linear symmetric gradient \(V(\mathbb {\epsilon } u) = (\kappa + \left| \mathbb {\epsilon } u\right| )^{(p-2)/2} \mathbb {\epsilon } u\), \(\kappa \ge 0\), which measures the ellipticity of the p-Stokes system, has 1/2 temporal derivatives in a Nikolskii space.

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来源期刊

Journal of Mathematical Fluid Mechanics 物理-力学

CiteScore

2.00

自引率

15.40%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Mathematical Fluid Mechanics (JMFM)is a forum for the publication of high-quality peer-reviewed papers on the mathematical theory of fluid mechanics, with special regards to the Navier-Stokes equations. As an important part of that, the journal encourages papers dealing with mathematical aspects of computational theory, as well as with applications in science and engineering. The journal also publishes in related areas of mathematics that have a direct bearing on the mathematical theory of fluid mechanics. All papers will be characterized by originality and mathematical rigor. For a paper to be accepted, it is not enough that it contains original results. In fact, results should be highly relevant to the mathematical theory of fluid mechanics, and meet a wide readership.