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Controllability and observability of tempered fractional differential systems

Ilyasse Lamrani, Hanaa Zitane, Delfim F. M. Torres

2024Communications in Nonlinear Science and Numerical Simulation13 citationsDOIOpen Access PDF

Abstract

We study controllability and observability concepts of tempered fractional linear systems in the Caputo sense. First, we formulate a solution for the class of tempered systems under investigation by means of the Laplace transform method. Then, we derive necessary and sufficient conditions for the controllability, as well as for the observability, in terms of the Gramian controllability matrix and the Gramian observability matrix, respectively. Moreover, we establish the Kalman criteria that allows one to check easily the controllability and the observability for tempered fractional systems. Applications to the fractional Chua’s circuit and Chua–Hartley’s oscillator models are provided to illustrate the theoretical results developed in this manuscript. • Well-posedness, controllability, and observability of tempered fractional systems. • Necessary & sufficient Gramian matrix criteria for controllability & observability. • Rank conditions for controllability & observability of tempered fractional systems. • A controllable tempered fractional Chua’s circuit. • An observable tempered linearized Chua–Hartley oscillator model.

Topics & Concepts

ObservabilityControllabilityMathematicsDifferential (mechanical device)Control theory (sociology)Applied mathematicsComputer sciencePhysicsArtificial intelligenceControl (management)ThermodynamicsAdvanced Control Systems DesignFractional Differential Equations SolutionsNumerical methods for differential equations
Controllability and observability of tempered fractional differential systems | Litcius