An averaging principle for stochastic switched systems with Levy noise

被引:4
|
作者
Ma, Shuo [1 ,2 ]
Kang, Yanmei [1 ]
机构
[1] Xi An Jiao Tong Univ, Sch Math & Stat, Xian 710049, Shaanxi, Peoples R China
[2] North Minzu Univ, Sch Math & Informat Sci, Yinchuan, Ningxia, Peoples R China
来源
MATHEMATICAL METHODS IN THE APPLIED SCIENCES | 2020年 / 43卷 / 15期
基金
中国国家自然科学基金;
关键词
averaging principle; L<mml; math altimg="urn; x-wiley; mma; media; mma6538; mma6538-math-0002" display="inline"><mml; mi>e</mml; mi></mml; math>vy noise; non-Lipschitz condition; stochastic switched systems; FUNCTIONAL-DIFFERENTIAL EQUATIONS; TO-STATE STABILITY; DIFFUSION; EXISTENCE; CONVERGENCE; UNIQUENESS; MODELS;
D O I
10.1002/mma.6538
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, we present an averaging method for stochastic switched systems with Levy noise under non-Lipschitz condition. With the help of successive approximation method and Bihari's inequality, the existence and uniqueness of the solutions of original and averaged systems are proved. Then, under suitable assumptions, we show that the solution of stochastic switched system with Levy noise strongly converges to the solution of the corresponding averaged equation.
引用
收藏
页码:8714 / 8727
页数:14
相关论文
共 50 条
  • [31] Moment exponential input-to-state stability of non-linear switched stochastic systems with Levy noise
    Li, Mengling
    Deng, Feiqi
    IET CONTROL THEORY AND APPLICATIONS, 2018, 12 (09): : 1208 - 1215
  • [32] STOCHASTIC AVERAGING PRINCIPLE FOR DYNAMICAL SYSTEMS WITH FRACTIONAL BROWNIAN MOTION
    Xu, Yong
    Guo, Rong
    Liu, Di
    Zhang, Huiqing
    Duan, Jinqiao
    DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B, 2014, 19 (04): : 1197 - 1212
  • [33] STRONG CONVERGENCE OF PRINCIPLE OF AVERAGING FOR MULTISCALE STOCHASTIC DYNAMICAL SYSTEMS
    Liu, Di
    COMMUNICATIONS IN MATHEMATICAL SCIENCES, 2010, 8 (04) : 999 - 1020
  • [34] Dynamic programming principle for stochastic control problems driven by general Levy noise
    Goldys, Ben
    Wu, Wei
    STOCHASTIC ANALYSIS AND APPLICATIONS, 2016, 34 (06) : 1083 - 1093
  • [35] THE STAMPACCHIA MAXIMUM PRINCIPLE FOR STOCHASTIC PARTIAL DIFFERENTIAL EQUATIONS FORCED BY LEVY NOISE
    Phuong Nguyen
    Temam, Roger
    COMMUNICATIONS ON PURE AND APPLIED ANALYSIS, 2020, 19 (04) : 2289 - 2331
  • [36] Weak and strong averaging principle for a stochastic coupled fast-slow atmosphere-ocean model with non-Lipschitz Levy noise
    Shi, Yangyang
    Gao, Hongjun
    NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2022, 218
  • [37] Stability of stochastic Levy noise coupled systems with mixed delays
    Zhou, Hui
    Jiang, Qiguang
    Li, Wenxue
    Feng, Jiqiang
    INTERNATIONAL JOURNAL OF CONTROL, 2022, 95 (01) : 234 - 248
  • [38] Synchronization for stochastic hybrid coupled controlled systems with Levy noise
    Zhou, Hui
    Li, Yueying
    Li, Wenxue
    MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2020, 43 (17) : 9557 - 9581
  • [39] Dynamical inference for transitions in stochastic systems with α-stable Levy noise
    Gao, Ting
    Duan, Jinqiao
    Kan, Xingye
    Cheng, Zhuan
    JOURNAL OF PHYSICS A-MATHEMATICAL AND THEORETICAL, 2016, 49 (29)
  • [40] pth moment polynomial input-to-state stability of switched neutral pantograph stochastic hybrid systems with Levy noise
    Yu, Peilin
    Deng, Feiqi
    Wan, Fangzhe
    Liu, Xiongding
    INTERNATIONAL JOURNAL OF SYSTEMS SCIENCE, 2022, 53 (15) : 3145 - 3153
12345