Controller Synthesis for Input-State Data With Measurement Errors
Andrea Bisoffi, Lidong Li, Claudio De Persis, Nima Monshizadeh
Abstract
We consider the problem of designing a state-feedback controller for a linear system, based only on noisy input-state data. We focus on input-state data corrupted by measurement errors, which, albeit less investigated, are as relevant as process disturbances in applications. For energy and instantaneous bounds on these measurement errors, we derive linear matrix inequalities for controller design where the one for the energy bound is equivalent to robust stabilization of all systems consistent with the noisy data points via a common Lyapunov function.
Topics & Concepts
Control theory (sociology)State (computer science)Controller (irrigation)Computer scienceFocus (optics)Lyapunov functionProcess (computing)Linear matrix inequalityEnergy (signal processing)Linear systemObservational errorMathematicsAlgorithmControl (management)Mathematical optimizationArtificial intelligenceStatisticsNonlinear systemQuantum mechanicsOperating systemAgronomyMathematical analysisPhysicsBiologyOpticsControl Systems and IdentificationStability and Control of Uncertain SystemsAdvanced Control Systems Optimization