Global existence and long time behavior of solutions to some Oldroyd type models in hybrid Besov spaces

IF 1.2 3区数学 Q1 MATHEMATICS

Journal of Mathematical Analysis and Applications Pub Date : 2025-04-02 DOI:10.1016/j.jmaa.2025.129547

Hantaek Bae , Jaeyong Shin

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引用次数: 0

Abstract

In this paper, we deal with some Oldroyd type models, which describe incompressible viscoelastic fluids. There are 3 parameters in these models: the viscous coefficient of fluid

ν_{1}

, the viscous coefficient of the elastic part of the stress tensor

ν_{2}

, and the damping coefficient of the elastic part of the stress tensor α. In this paper, we assume at least one of the parameters is zero:

(ν_{1}, ν_{2}, α) = (+, 0, +), (+, 0, 0), (0, +, +), (0, +, 0), (0, 0, +)

and prove the global existence of unique solutions to all these 5 cases in the framework of hybrid Besov spaces. We also derive decay rates of the solutions except for the case

(ν_{1}, ν_{2}, α) = (+, 0, 0)

. To the best of our knowledge, decay rates in this paper are the first results in this framework, and can improve some previous works.

查看原文本刊更多论文

混合Besov空间中某些Oldroyd型模型解的整体存在性和长时性

本文讨论了一些描述不可压缩粘弹性流体的Oldroyd型模型。这些模型中有3个参数：流体的粘性系数ν1，应力张量的弹性部分的粘性系数ν2，应力张量的弹性部分的阻尼系数α。本文假设至少有一个参数为零：(ν1,ν2,α)=(+,0,+),(+,0,0),(0,+,+),(0,+,0),(0, +,0)，并证明了这5种情况在混合Besov空间框架下的全局唯一解的存在性。除了(ν1,ν2,α)=(+,0,0)的情况外，我们还导出了解的衰减率。据我们所知，本文中的衰减率是该框架中的第一个结果，可以改进以前的一些工作。

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

Journal of Mathematical Analysis and Applications 数学-数学

CiteScore

2.50

自引率

7.70%

发文量

790

审稿时长

6 months

期刊介绍： The Journal of Mathematical Analysis and Applications presents papers that treat mathematical analysis and its numerous applications. The journal emphasizes articles devoted to the mathematical treatment of questions arising in physics, chemistry, biology, and engineering, particularly those that stress analytical aspects and novel problems and their solutions. Papers are sought which employ one or more of the following areas of classical analysis: • Analytic number theory • Functional analysis and operator theory • Real and harmonic analysis • Complex analysis • Numerical analysis • Applied mathematics • Partial differential equations • Dynamical systems • Control and Optimization • Probability • Mathematical biology • Combinatorics • Mathematical physics.