access icon free Stabilisation of stochastic delay Markovian reaction-diffusion systems via boundary control

This study considers asymptotic stability in the mean square sense for stochastic delay Markovian reaction-diffusion systems (SDMRDSs) via boundary control. Firstly, the authors present a boundary controller for the system. By constructing of a Lyapunov–Krasovskii functional and utilising of Poincaré inequality, a sufficient criterion of mean square asymptotic stability for SDMRDSs is established. Next, boundary control for stochastic Markovian reaction-diffusion systems (SMRDSs) with time-varying delays is also investigated, and a delay-dependent sufficient condition for SMRDSs under the boundary control law is obtained. In addition, the robust boundary stabilisation of SMRDSs with parametric uncertainty is considered. Finally, numerical examples are presented to demonstrate the effectiveness of the proposed results.

Inspec keywords: reaction-diffusion systems; asymptotic stability; Lyapunov methods; Markov processes; robust control; stochastic systems; delay systems; uncertain systems

Other keywords: time-varying delays; Lyapunov–Krasovskii functional; delay-dependent sufficient condition; robust boundary stabilisation; boundary controller; Poincaré inequality; sufficient criterion; SDMRDSs; parametric uncertainty; boundary control law; mean square asymptotic stability; stochastic delay Markovian reaction-diffusion systems; stochastic Markovian reaction-diffusion systems

Subjects: Time-varying control systems; Markov processes; Stability in control theory; Algebra; Distributed parameter control systems

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