两类带 Markov 切换的随机比例泛函微分方程全局解的存在唯一性和稳定性

数学物理学报 ›› 2025, Vol. 45 ›› Issue (4): 1184-1205.

两类带 Markov 切换的随机比例泛函微分方程全局解的存在唯一性和稳定性

梁青()

海南师范大学数学与统计学院海口 571158

收稿日期:2024-11-15 修回日期:2025-02-10 出版日期:2025-08-26 发布日期:2025-08-01
作者简介:E-mail: liangqing1112@sina.com
基金资助:
海南省教育厅项目(Hnky2024-13)

Existence, Uniqueness and Stability of the Global Solutions to Two Classes of Pantogragh Stochastic Functional Differential Equations with Markovian Switching

Liang Qing()

College of Mathematics and Statistics, Hainan Normal University, Haikou 571158

Received:2024-11-15 Revised:2025-02-10 Online:2025-08-26 Published:2025-08-01
Supported by:
Education Department of Hainan Province(Hnky2024-13)

摘要/Abstract

摘要：

研究了带 Markov 切换的随机比例泛函微分方程全局解的存在唯一性和 $\lambda$ 稳定性, 采用向量形式的 Lyapunov 函数方法,得到了方程全局解的存在唯一性定理、矩的 $ \lambda $ 稳定性定理和几乎必然 $ \lambda $ 稳定性定理. 此外, 把脉冲效应引入系统,针对脉冲的不同特点以及 $ \lambda $ 类函数不同的衰减速率, 证明了在适当条件下类似结论仍然成立, 推广了已有的结果. 最后, 通过举例和给出数值模拟说明了结论的有效性.

关键词: 存在唯一性, 稳定性, 随机比例泛函微分方程, 脉冲, Itô, 公式

Abstract:

In this paper, the existence, uniqueness and $ \lambda $ stability of the global solutions to the pantogragh stochastic functional differential equations with Markovian switching are investigated. By applying the vector Lyapunov function method, we obtain some theorems ensuring the existence, uniqueness, moment $ \lambda $ stability and almost sure $ \lambda $ stability of the global solutions to the equations. Furthermore, impulsive effects are introduced to the systems.According to the different characteristics of the impulses and different decay rates of the $ \lambda $ functions we prove that similar results still hold under suitable conditions.Our results generalize some existing results.Finally, an example and numerical simulation is given to illustrate the effectiveness of the results.

Key words: existence and uniqueness, stability, pantogragh stochastic functional differential equation, impulse, Itô, formula

中图分类号:

O211.4

梁青. 两类带 Markov 切换的随机比例泛函微分方程全局解的存在唯一性和稳定性[J]. 数学物理学报, 2025, 45(4): 1184-1205.

Liang Qing. Existence, Uniqueness and Stability of the Global Solutions to Two Classes of Pantogragh Stochastic Functional Differential Equations with Markovian Switching[J]. Acta mathematica scientia,Series A, 2025, 45(4): 1184-1205.

图/表 1

参考文献 14

[1]	Song M H, Mao X R. Almost sure exponential stability of hybrid stochastic functional differential equations. Journal of Mathematical Analysis and Applications, 2018, 4.8(2): 1390-1408
[2]	Ruan D H, Xu L P, Luo J W. Stability of hybrid stochastic functional differential equations. Applied Mathematics and Computation, 2019, 3.6: 832-841 doi: 10.1016/j.amc.2018.03.064
[3]	Gao L J, Wang D D, Zong G D. Exponential stability for generalized stochastic impulsive functional differential equations with delayed impulses and Markovian switching. Nonlinear Analysis-Hybrid Systems, 2018, 30: 199-212
[4]	Zhu Q X. Pth Moment exponential stability of impulsive stochastic functional differential equations with Markovian switching. Journal of the Franklin Institute, 2014, 3.1(7): 3965-3986
[5]	Feng L C, Li S M, Mao X R. Asymptotic stability and boundedness of stochastic functional differential equations with Markovian switching. Journal of the Franklin Institute, 2016, 3.3(18): 4924-4949
[6]	Peng S G, Yang L P. The pth moment boundedness of stochastic functional differential equations with Markovian switching. Journal of the Franklin Institute, 2017, 3.4(1): 345-359
[7]	Kao Y G, Zhu Q X, Qi W H. Exponential stability and instability of impulsive stochastic functional differential equations with Markovian switching. Applied Mathematics and Computation, 2015, 2.1: 795-804
[8]	李钊, 李树勇. 一类 Markov 切换的脉冲随机偏泛函微分方程的均方稳定性分析. 系统科学与数学, 2020, 40(12): 2225-2236 doi: 10.12341/jssms14052
	Li Z, Li S Y. Mean square stability analysis for a class of impulsive stochastic partial functional differential equations with Markovian switching. J Sys Sci and Math Scis, 2020, 40(12): 2225-2236 doi: 10.12341/jssms14052
[9]	Song Y, Zeng Z. Razumikhin-type theorems on pth moment boundedness of neutral stochastic functional differential equations with Markovian switching. J Franklin Inst, 2018, 3.5(17): 8296-8312
[10]	Wu H, Hu J H, Yuan C G. Stability of hybrid pantogragh stochastic functional differential equations. Systems and Control Letters, 2022, 1.0: 105105
[11]	Xu L P, Li Z, Huang B C. $h$-stability for stochastic functional differential equation driven by time-chaed Lévy process. AIMS Mathematics, 2023, 8(10): 22963-22983
[12]	Mao X R, Yuan C G. Stochastic Differential Equations with Markovian Switching. London: Imperial College Press, 2006
[13]	Liptser R, Shiryaev A. Theory of Martingales. Netherlands: Kluwer Academic Publishers, 1989
[14]	肖可, 李树勇. 具 Markov 切换和 Lévy 噪声的中立型随机泛函微分方程 $ p $ 阶矩指数稳定性. 四川师范大学学报 (自然科学版), 2022, 45(2): 184-194
	Xiao K, Li S Y. On exponential stability for the pth moment of neutral stochastic functional differential equations with Markovian switching and Lévy noise. Journal of Sichuan Normal University (Natrual Science), 2022, 45(2): 184-194

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