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Regulation‐triggered adaptive control of a hyperbolic PDE‐ODE model with boundary interconnections

Ji Wang, Miroslav Krstić

2021International Journal of Adaptive Control and Signal Processing22 citationsDOI

Abstract

Summary We present a certainty equivalence‐based adaptive boundary control scheme with a regulation‐triggered batch least‐squares identifier, for a heterodirectional transport partial differential equation‐ordinary differential equation (PDE‐ODE) system where the transport speeds of both transport PDEs are unknown. We use a nominal controller which is fed piecewise‐constant parameter estimates from an event‐triggered parameter update law that applies a least‐squares estimator to data “batches” collected over time intervals between the triggers. A parameter update is triggered by an observed growth in the norm of the PDE state. The proposed triggering‐based adaptive control guarantees: (1) the absence of a Zeno phenomenon; (2) parameter estimates are convergent to the true values in finite time (from most initial conditions); (3) exponential regulation of the plant states to zero. The effectiveness of the proposed design is verified by a numerical example.

Topics & Concepts

MathematicsOrdinary differential equationPartial differential equationOdePiecewiseControl theory (sociology)EstimatorRiccati equationAdaptive controlApplied mathematicsBoundary (topology)Distributed parameter systemEstimation theoryDifferential equationMathematical optimizationMathematical analysisComputer scienceControl (management)AlgorithmStatisticsArtificial intelligenceStability and Controllability of Differential EquationsAdvanced Mathematical Modeling in EngineeringNumerical methods for differential equations
Regulation‐triggered adaptive control of a hyperbolic PDE‐ODE model with boundary interconnections | Litcius