Spatial domain decomposition approach to dynamic compensator design for linear space-varying parabolic MIMO PDEs
DOI10.1049/IET-CTA.2019.0404zbMATH Open1544.93671MaRDI QIDQ6598688
Publication date: 5 September 2024
Published in: IET Control Theory \& Applications (Search for Journal in Brave)
linear matrix inequalitiesfeedbackobserversasymptotic stabilityperiodic boundary conditionsdistributed parameter systemsnonlinear control systemspartial differential equationssufficient conditionscompensationLyapunov methodsactuatorsclosed loop systemscontrol system synthesisexponential stabilisationdynamic compensator designLMI-based conditionsalgebraic linear matrix inequalitiesclosed-loop coupled PDEslinear space-varying parabolic MIMOmultiple-input-multiple-output partial differential equationsobserver-based dynamic feedback compensatorobserver-based feedback control techniquepartial areasspatial domain decomposition approachsubdomain conditions
Control/observation systems governed by partial differential equations (93C20) Feedback control (93B52) Multivariable systems, multidimensional control systems (93C35) Linear systems in control theory (93C05) Multigrid methods; domain decomposition for initial value and initial-boundary value problems involving PDEs (65M55) Parabolic equations and parabolic systems (35K99) Exponential stability (93D23) Observers (93B53)
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- Design of distributed \(H_\infty\) fuzzy controllers with constraint for nonlinear hyperbolic PDE systems
- Lyapunov-based design of locally collocated controllers for semi-linear parabolic PDE systems
- Robust sampled-data control of a class of semilinear parabolic systems
- Sampled-data distributed \(H_\infty\) control of a class of 1-D parabolic systems under spatially point measurements
- Nonlinear and robust control of PDE systems. Methods and applications to transport-reaction processes
- An LMI approach to \({\mathcal H}_\infty\) boundary control of semilinear parabolic and hyperbolic systems
- Semigroups of linear operators and applications to partial differential equations
- A new robust D-stability condition for real convex polytopic uncertainty
- Local exponential stabilization via boundary feedback controllers for a class of unstable semi-linear parabolic distributed parameter processes
- Pointwise exponential stabilization of a linear parabolic PDE system using non-collocated pointwise observation
- Observer-based boundary control of semi-linear parabolic PDEs with non-collocated distributed event-triggered observation
- Sampled-data relay control of diffusion PDEs
- On the ISS properties of a class of parabolic DPS' with discontinuous control using sampled-in-space sensing and actuation
- Sampled-data distributed \(H_{\infty}\) control of transport reaction systems
- A spatial domain decomposition approach to distributed H ∞ observer design of a linear unstable parabolic distributed parameter system with spatially discrete sensors
- Boundary Control of PDEs
- A Sampled-Data Singularly Perturbed Boundary Control for a Heat Conduction System With Noncollocated Observation
- Adaptive Control of 2-D PDEs Using Mobile Collocated Actuator/Sensor Pairs With Augmented Vehicle Dynamics
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