具有温度相关传输系数的平面磁流体力学的全局存在性和指数稳定性

IF 1.2 4区数学 Q2 MATHEMATICS, APPLIED

Communications in Mathematical Sciences Pub Date : 2024-07-15 DOI:10.4310/cms.2024.v22.n5.a4

Ying Sun, Jianwen Zhang

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引用次数: 0

摘要

本文关注的是平面可压缩磁流体动力学的初始值和边界值问题，该问题的传输系数与温度有关。当粘度 $\mu (\theta) = \lambda (\theta) = \theta^\alpha$，磁扩散率 $\nu (\theta ) = \theta^\alpha$，热传导率 $\kappa (\theta ) = \theta^\beta$，且 $\alpha 、\beta \in[0, \infty)$，在对增长指数 $\alpha$ 和初始规范的一些限制下，我们证明了强解的全局存在性。作为副产品，我们得到了解的指数稳定性。值得指出的是，如果 $\alpha \geq 0$ 较小，初始数据可以很大，而热导率的增长指数 $\beta \geq 0$ 可以任意大。

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Global existence and exponential stability of planar magnetohydrodynamics with temperature-dependent transport coefficients

This paper is concerned with an initial and boundary value problem for planar compressible magnetohydrodynamics with temperature-dependent transport coefficients. In the case when the viscosity $\mu (\theta) = \lambda (\theta) = \theta^\alpha$, the magnetic diffusivity $\nu (\theta ) = \theta^\alpha$ and the heat-conductivity $\kappa (\theta ) = \theta^\beta$ with $\alpha ,\beta \in[0, \infty)$, we prove the global existence of strong solution under some restrictions on the growth exponent $\alpha$ and the initial norms. As a byproduct, the exponential stability of the solution is obtained. It is worth pointing out that the initial data could be large if $\alpha \geq 0$ is small, and the growth exponent of heat-conductivity $\beta \geq 0$ can be arbitrarily large.

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来源期刊

Communications in Mathematical Sciences 数学-应用数学

CiteScore

1.70

自引率

10.00%

发文量

审稿时长

6 months

期刊介绍： Covers modern applied mathematics in the fields of modeling, applied and stochastic analyses and numerical computations—on problems that arise in physical, biological, engineering, and financial applications. The journal publishes high-quality, original research articles, reviews, and expository papers.