Mean-square finite and prescribed-time stability for nonlinear stochastic parabolic distributed parameter systems

Abstract

In this paper, the mean-square finite-time stability (MSFTS) and mean-square prescribed-time stability (MSPTS) of a class of nonlinear stochastic parabolic distributed parameter systems are studied. An internal dynamic variable is introduced to design dynamic periodic event-triggered mechanism (DPETM) for FTS. Moreover, a new prescribed-time DPETM is proposed by combining two different adjustment functions to reduce the update frequency of the controller. Based on designing distributed controllers, the sufficient conditions for the closed-loop system’s MSFTS and MSPTS are provided in the form of linear matrix inequalities (LMIs), respectively. Here, the Lyapunov–Krasovskii functional method, integral inequality, and L’Hospital’s rule are used. Finally, two numerical examples verify the effectiveness of the proposed finite-time and prescribed-time control algorithms.