无界区域中二维随机对流Brinkman-Forchheimer方程的H^1 -随机吸引子

IF 1.5 3区数学 Q1 MATHEMATICS

Advances in Differential Equations Pub Date : 2021-11-15 DOI:10.57262/ade028-0910-807

K. Kinra, M. T. Mohan

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引用次数: 1

摘要

本文讨论了二维随机对流Brinkman-Forchheimer (2D SCBF)方程在无界域(例如Poincar\'e域)上解的渐近行为。我们首先证明了由二维SCBF方程(对于吸收指数$r\in[1,3]$)在庞加莱域上受加性噪声扰动所产生的随机流$\mathbb{H}^1$-随机吸引子的存在性。进一步，我们推导了定义在Poincar\'e域上的二维SCBF方程在$\mathbb{H}^1$中存在唯一不变测度。此外，还讨论了这些结果在一般无界域上的推广。最后，对于加性一维维纳噪声强迫的二维SCBF方程，我们证明了当区域由有界变为无界(Poincar\'e)时，随机吸引子的上半连续性。

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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$\mathbb H^1$-random attractors for 2d stochastic convective Brinkman-Forchheimer equations in unbounded domains

The asymptotic behavior of solutions of two dimensional stochastic convective Brinkman-Forchheimer (2D SCBF) equations in unbounded domains is discussed in this work (for example, Poincar\'e domains). We first prove the existence of $\mathbb{H}^1$-random attractors for the stochastic flow generated by 2D SCBF equations (for the absorption exponent $r\in[1,3]$) perturbed by an additive noise on Poincar\'e domains. Furthermore, we deduce the existence of a unique invariant measure in $\mathbb{H}^1$ for the 2D SCBF equations defined on Poincar\'e domains. In addition, a remark on the extension of these results to general unbounded domains is also discussed. Finally, for 2D SCBF equations forced by additive one-dimensional Wiener noise, we prove the upper semicontinuity of the random attractors, when the domain changes from bounded to unbounded (Poincar\'e).

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来源期刊

Advances in Differential Equations MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

1.90

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Advances in Differential Equations will publish carefully selected, longer research papers on mathematical aspects of differential equations and on applications of the mathematical theory to issues arising in the sciences and in engineering. Papers submitted to this journal should be correct, new and non-trivial. Emphasis will be placed on papers that are judged to be specially timely, and of interest to a substantial number of mathematicians working in this area.