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Λ − <i>φ</i> generalized synchronization: application to fractional hyperchaotic systems with arbitrary dimensions and orders

Adel Ouannas, X. Wang, Viet–Thanh Pham, Toufik Ziar

2020Automatika8 citationsDOIOpen Access PDF

Abstract

This paper investigates the $\Lambda -\phi $ generalized synchronization between non-identical fractional-order systems characterized by different dimensions and different orders. The $\Lambda -\phi $ generalized synchronization combines the inverse matrix projective synchronization with the generalized synchronization. In particular, the proposed approach enables $\Lambda -\phi $ generalized synchronization to be achieved between n-dimensional master system and m-dimensional slave system in different dimensions. The technique, which exploits nonlinear controllers, stability property of integer-order linear systems and Lyapunov stability theory, proves to be effective in achieving the $\Lambda -\phi $ generalized synchronization. Finally, the approach is applied between 4-D and 5-D fractional hyperchaotic systems with the aim to illustrate the capabilities of the novel scheme proposed herein.

Topics & Concepts

Synchronization (alternating current)Control theory (sociology)Lyapunov stabilitySynchronization of chaosStability (learning theory)MathematicsNonlinear systemInteger (computer science)InverseComputer scienceTopology (electrical circuits)Control (management)CombinatoricsMachine learningProgramming languageArtificial intelligencePhysicsQuantum mechanicsGeometryChaos control and synchronizationNonlinear Dynamics and Pattern FormationQuantum chaos and dynamical systems
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