Litcius/Paper detail

Exponential Stability of Fractional-Order Impulsive Control Systems With Applications in Synchronization

Shuai Yang, Cheng Hu, Juan Yu, Haijun Jiang

2020IEEE Transactions on Cybernetics163 citationsDOI

Abstract

This paper investigates exponential stability of fractional-order impulsive control systems (FICSs) and exponential synchronization of fractional-order Cohen-Grossberg neural networks (FCGNNs). First, under the framework of the generalized Caputo fractional-order derivative, some new results for fractional-order calculus are established by mainly using L'Hospital's rule and Laplace transform. Besides, FICSs are translated into impulsive differential equations with fractional-order via utilizing the definition of Dirac function, which reveals that the effect of impulsive control on fractional systems is dependent of the order of the addressed systems. Furthermore, exponential stability of FICSs is proposed and some novel criteria are obtained by applying average impulsive interval and the method of induction. As an application of the stability for FICSs, exponential synchronization of FCGNNs is considered and several synchronization conditions are established under impulsive control. Finally, several numerical examples are provided to illustrate the effectiveness of the derived results.

Topics & Concepts

Laplace transformFractional calculusExponential functionSynchronization (alternating current)Exponential stabilityMathematicsApplied mathematicsControl theory (sociology)Stability (learning theory)Computer scienceControl (management)Mathematical analysisTopology (electrical circuits)Nonlinear systemPhysicsArtificial intelligenceQuantum mechanicsMachine learningCombinatoricsNeural Networks Stability and SynchronizationChaos control and synchronizationNeural Networks and Applications
Exponential Stability of Fractional-Order Impulsive Control Systems With Applications in Synchronization | Litcius