Donato Cafagna scite author profile

This paper presents an approach for generating new hyperchaotic attractors in a ring of Chua's circuits. By taking a closed chain of three circuits and exploiting sine functions as nonlinearities, the proposed technique enables 3D-scroll attractors to be generated. In particular, the paper shows that 3D-scroll dynamics can be designed by modifying six parameters related to the circuit nonlinearities.

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Bifurcation and Chaos in the Fractional-Order Chen System via a Time-Domain Approach

Cafagna

Grassi

2008

Int. J. Bifurcation Chaos

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This tutorial investigates bifurcation and chaos in the fractional-order Chen system from the time-domain point of view. The objective is achieved using the Adomian decomposition method, which allows the solution of the fractional differential equations to be written in closed form. By taking advantage of the capabilities given by the decomposition method, the paper illustrates two remarkable findings: (i) chaos exists in the fractional Chen system with order as low as 0.24, which represents the smallest value ever reported in literature for any chaotic system studied so far; (ii) it is feasible to show the occurrence of pitchfork bifurcations and period-doubling routes to chaos in the fractional Chen system, by virtue of a systematic time-domain analysis of its dynamics.

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On the simplest fractional-order memristor-based chaotic system

2012

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Donato Cafagna

Fractional calculus: A mathematical tool from the past for present engineers [Past and present]

New 3d-Scroll Attractors in Hyperchaotic Chua's Circuits Forming a Ring

Bifurcation and Chaos in the Fractional-Order Chen System via a Time-Domain Approach

On the simplest fractional-order memristor-based chaotic system

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