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Identification of structured nonlinear state–space models for hysteretic systems using neural network hysteresis operators

Konstantinos Krikelis, Jin‐Song Pei, Koos van Berkel, Maarten Schoukens

2023Measurement10 citationsDOIOpen Access PDF

Abstract

Hysteretic system behavior is ubiquitous in science and engineering fields including measurement systems and applications. In this paper, we put forth a nonlinear state-space system identification method that combines the state-space equations to capture the system dynamics with a compact and exact artificial neural network (ANN) representation of the classical Prandtl–Ishlinskii (PI) hysteresis. These ANN representations called PI hysteresis operator neurons employ recurrent ANNs with classical activation functions, and thus can be trained with classical neural network learning algorithms. The structured nonlinear state-space model class proposed in this paper, for the first time, offers a flexible interconnection of PI hysteresis operators with a linear state-space model through a linear fractional representation. This results in a comprehensive and flexible model structure. The performance is validated both on numerical simulation and on measurement data.

Topics & Concepts

Nonlinear systemArtificial neural networkState spaceHysteresisRepresentation (politics)Nonlinear system identificationState-space representationControl theory (sociology)Operator (biology)System identificationComputer scienceMathematicsArtificial intelligenceAlgorithmPhysicsData modelingDatabasePoliticsChemistryRepressorBiochemistryGeneStatisticsPolitical scienceControl (management)Transcription factorQuantum mechanicsLawPiezoelectric Actuators and ControlMagnetic Properties and ApplicationsModel Reduction and Neural Networks
Identification of structured nonlinear state–space models for hysteretic systems using neural network hysteresis operators | Litcius