STABILITY OF CONTROLLED STOCHASTIC DYNAMIC SYSTEMS OF RANDOM STRUCTURE WITH MARKOV SWITCHES AND POISSON PERTURBATIONS

T. Lukashiv, I. Malyk
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引用次数: 1

Abstract

Lyapunov’s second method is used to study the problem of stability of controlled stochastic dynamical systems of random structure with Markov and Poisson perturbations. Markov switches reflect random effects on the system at fixed points in time. Poisson perturbations describe random effects on the system at random times. In both cases there may be breaks in the phase trajectory of the first kind. The conditions for the coefficients of the system are written, which guarantee the existence and uniqueness of the solution of the stochastic system of a random structure, which is under the action of Markov switches and Poisson perturbations. The differences between these systems and systems that do not contain internal perturbations in the equation, which cause a change in the structure of the system, and external perturbations, which cause breaks in the phase trajectory at fixed points in time, are discussed. The upper bound of the solution for the norm is obtained. The definition of the discrete Lyapunov operator based on the system and the Lyapunov function for the above-mentioned systems is given. Sufficient conditions of asymptotic stochastic stability in general, stability in l.i.m. and asymptotic stability in the l.i.m. for controlled stochastic dynamic systems of random structure with Markov switches and Poisson perturbations are obtained. A model example that reflects the features of the stability of the solution of a system with perturbations is considered: the conditions of asymptotic stability in the root mean square as a whole are established; the conditions of exponential stability and exponential instability are discussed. For linear systems, the necessary and sufficient stability conditions are determined in the example, based on the generalized Lyapunov exponent.
具有马尔可夫开关和泊松扰动的受控随机结构动态系统的稳定性
利用李亚普诺夫第二方法研究了具有马尔可夫摄动和泊松摄动的可控随机结构动力系统的稳定性问题。马尔可夫开关反映了系统在固定时间点上的随机效应。泊松扰动描述了系统在随机时间的随机效应。在这两种情况下,第一种相轨迹都可能出现断裂。给出了系统系数的条件,保证了马尔可夫开关和泊松摄动作用下的随机结构系统解的存在唯一性。讨论了这些系统与方程中不包含引起系统结构变化的内部摄动和在固定时间点引起相轨迹中断的外部摄动的系统之间的区别。得到了范数解的上界。给出了基于该系统的离散Lyapunov算子的定义以及上述系统的Lyapunov函数。得到了具有马尔可夫开关和泊松扰动的受控随机结构动态系统的一般渐近随机稳定的充分条件、线性系统的稳定性和线性系统的渐近稳定性。考虑了一个反映扰动系统解的稳定性特征的模型实例:建立了整体上均方根渐近稳定的条件;讨论了指数稳定和指数不稳定的条件。对于线性系统,基于广义李雅普诺夫指数,给出了系统稳定性的充分必要条件。
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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