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Quadratic Regularization of Data-Enabled Predictive Control: Theory and Application to Power Converter Experiments

Linbin Huang, Jianzhe Zhen, John Lygeros, Florian Dörfler

2021IFAC-PapersOnLine32 citationsDOIOpen Access PDF

Abstract

Data-driven control that circumvents the process of system identification by providing optimal control inputs directly from system data has attracted renewed attention in recent years. In this paper, we focus on understanding the effects of the regularization on the data-enabled predictive control (DeePC) algorithm. We provide theoretical motivation and interpretation for including a quadratic regularization term. Our analysis shows that the quadratic regularization term leads to robust and optimal solutions with regards to disturbances affecting the data. Moreover, when the input/output constraints are inactive, the quadratic regularization leads to a closed-form solution of the DeePC algorithm and thus enables fast calculations. On this basis, we propose a framework for data-driven synchronization and power regulations of power converters, which is tested by high-fidelity simulations and experiments.

Topics & Concepts

Regularization (linguistics)Quadratic equationFidelityComputer scienceModel predictive controlOptimal controlData-drivenControl theory (sociology)Control (management)MathematicsMathematical optimizationArtificial intelligenceTelecommunicationsGeometryControl Systems and IdentificationAdvanced Control Systems OptimizationFault Detection and Control Systems
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