摄动半空间中非等熵Euler-Poisson系统平稳解的稳定性

IF 1.3 3区数学 Q2 MATHEMATICS, APPLIED

Journal of Mathematical Fluid Mechanics Pub Date : 2025-08-25 DOI:10.1007/s00021-025-00971-x

Mingjie Li, Masahiro Suzuki

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引用次数: 0

摘要

本文的主要目的是用数学方法研究非平面壁面附近等离子体鞘层的形成。利用空间加权能量法，研究了非等熵欧拉-泊松方程在边界为图的域上平稳解的存在性和渐近稳定性。在初始扰动属于加权Sobolev空间的条件下，得到了解向平稳解的收敛速率。由于定义域是摄动半空间，我们首先证明了非等熵欧拉-泊松方程的时间全局可解性，然后利用时间全局解构造平稳解。

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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Stability of Stationary Solutions to the Nonisentropic Euler–Poisson System in a Perturbed Half Space

The main concern of this paper is to mathematically investigate the formation of a plasma sheath near the surface of nonplanar walls. We study the existence and asymptotic stability of stationary solutions for the nonisentropic Euler-Poisson equations in a domain of which boundary is drawn by a graph, by employing a space weighted energy method. Moreover, the convergence rate of the solution toward the stationary solution is obtained, provided that the initial perturbation belongs to the weighted Sobolev space. Because the domain is the perturbed half space, we first show the time-global solvability of the nonisentropic Euler-Poisson equations, then construct stationary solutions by using the time-global solutions.

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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.