Exponential Stability of Discrete-Time Markovian Jump Nonlinear Systems With Stochastic Impulses

This paper investigates the exponential stability (ES) of nonlinear discrete-time (DT) systems with stochastic impulses and Markovian jump. Employing the Lyapunov function method and the subsequence technique, the sufficient conditions for exponential stability of the pth moments (ES-pth) of the system are established. Generally, even if all the Markovian jump subsystems (MJSSs) are not ES-pth in the absence of impulses, impulses can still be used to achieve the ES-pth of the system in a specially designed interval, that is, when the impulses and Markovian jump signals meet the corresponding conditions. On the contrary, when all MJSSs are stable without impulses, as long as the impulses parameters and Markovian jump signals are relatively balanced, the system can still maintain the property of ES-pth. Finally, the effectiveness of results is further verified with three examples.

Automated summary

This paper investigates the exponential stability of nonlinear discrete-time systems with stochastic impulses and Markovian jump. The conditions for exponential stability of the pth moments are established. The effectiveness of the proposed method is further verified with three examples.