Please use this identifier to cite or link to this item: http://dspace.centre-univ-mila.dz/jspui/handle/123456789/3350
Title: REDUCED GENERALIZED COMBINATION SYNCHRONIZATION BETWEEN TWO n􀀀DIMENSIONAL INTEGER-ORDER HYPERCHAOTIC SYSTEMS AND ONE m􀀀DIMENSIONAL FRACTIONAL-ORDER CHAOTIC SYSTEM
Authors: Smail, Kaouache
Keywords: Reduced generalized combination synchronization; Chaotic or hyperchaotic system; Caputo fractional derivative; Stability theorem of fractional-order linear system.
Issue Date: 21-Dec-2020
Publisher: University Center of Abdelhafid boussouf -Mila
Series/Report no.: 17;02
Abstract: This paper is devoted to investigate the problem of reduced generalized combination synchronization (RGCS) between two n􀀀dimensional integer-order hyperchaotic drive systems and one m􀀀dimensional fractional-order chaotic response system. According to the stability theorem of fractional-order linear system, an active mode controller is proposed to accomplish this end. Moreover, the proposed synchronization scheme is applied to synchronize three different chaotic systems, which are the Danca hyperchaotic system, the modified hyperchaotic Rossler system, and the fractional-order Rabinovich-Fabrikant chaotic system. Finally, numerical results are presented to fit our theoretical analysis
URI: http://dspace.centre-univ-mila.dz/jspui/handle/123456789/3350
Appears in Collections:Mathematics and Computer Science

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