Passivity based distributed tracking control of networked Euler-Lagrange systems

This paper presents the fractional-order projection of a chaotic system, which delivers a collection of self-excited and hidden chaotic attractors as a function of a single system parameter. Based on an integer-order chaotic system and the proposed transformation, the fractional-order chaotic system obtains when the divergence of integer and fractional vector fields flows in the same direction. Phase portraits, bifurcation diagrams, and Lyapunov exponents validate the chaos generation. Apart from these results, two passivity-based fractional control laws are designed effectively for the integer and fractional-order chaotic systems. In both cases, the synchronization schemes depend on suitable storage functions given by the fractional Lyapunov theory. Several numerical experiments confirm the proposed approach and agree well with the mathematical deductions.

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Passivity based distributed tracking control of networked Euler-Lagrange systems

Cited by 3 publications

References 23 publications

Interconnection through u-average passivity in discrete time

Interconnection through u-average passivity in discrete time

Passivity-Based Control of Multiple Quadrotors Carrying a Cable-Suspended Payload

Fractional-order projection of a chaotic system with hidden attractors and its passivity-based synchronization

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