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Extremum Seeking Feedback With Wave Partial Differential Equation Compensation

Tiago Roux Oliveira, Miroslav Krstić

2020Journal of Dynamic Systems Measurement and Control16 citationsDOI

Abstract

Abstract This paper addresses the compensation of wave actuator dynamics in scalar extremum seeking (ES) for static maps. Infinite-dimensional systems described by partial differential equations (PDEs) of wave type have not been considered so far in the literature of ES. A distributed-parameter-based control law using back-stepping approach and Neumann actuation is initially proposed. Local exponential stability as well as practical convergence to an arbitrarily small neighborhood of the unknown extremum point is guaranteed by employing Lyapunov–Krasovskii functionals and averaging theory in infinite dimensions. Thereafter, the extension for wave equations with Dirichlet actuation, antistable wave PDEs as well as the design for the delay-wave PDE cascade are also discussed. Numerical simulations illustrate the theoretical results.

Topics & Concepts

MathematicsPartial differential equationWave equationDirichlet distributionControl theory (sociology)Scalar (mathematics)Mathematical analysisDecoupling (probability)Applied mathematicsBoundary value problemComputer scienceControl (management)GeometryControl engineeringEngineeringArtificial intelligenceExtremum Seeking Control SystemsNonlinear Dynamics and Pattern FormationCombustion and flame dynamics
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