...
  • 主题
高级搜索  >
历史搜索 清空历史
首页> 外文期刊>Asian Journal of Control: Affiliated with ACPA, the Asian Control Professors Association >Exponential Mean-Square Stability of Stochastic String Hybrid Systems Under Continuous Non-Gaussian Excitation
【24h】

Exponential Mean-Square Stability of Stochastic String Hybrid Systems Under Continuous Non-Gaussian Excitation

机译:Exponential Mean-Square Stability of Stochastic String Hybrid Systems Under Continuous Non-Gaussian Excitation

获取原文
获取原文并翻译 | 示例
           
页面导航
  • 摘要
  • 著录项
  • 相关主题

摘要

The problem of the exponential mean-square stability for nonlinear stochastic string hybrid system under parametric (multiplicative) Gaussian and external (additive) continuous non-Gaussian excitations is considered. The string hybrid system is treated as an infinite-dimensional family of strings (subsystems) with a switching rule that has the form of a right continuous Markov chain. It is described by infinite-dimension Ito stochastic differential equations. The excitations are assumed to be parametric Gaussian white noises and the continuous non-Gaussian processes modeled by polynomials of a Gaussian process. The nonlinear strings under external continuous non-Gaussian excitation are transformed to extended dimensional nonlinear strings with a special structure under a parametric Gaussian excitation. Using the methodology of the stability analysis of nonlinear hybrid systems with Markovian switchings the sufficient conditions of the exponential mean-square stability of nonlinear stochastic string systems under parametric Gaussian and external continuous non-Gaussian excitation with a Markovian switching are derived. The detailed calculations are given for linear systems.

著录项

获取原文

客服邮箱:kefu@zhangqiaokeyan.com

京公网安备:11010802029741号 ICP备案号:京ICP备15016152号-6 六维联合信息科技 (北京) 有限公司©版权所有

  • 客服微信

  • 服务号