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# Fractional Order Chaotic Systems 1.0

Date Added: August 27, 2013  |  Visits: 219

This toolbox contains the functions which can be used to simulate some of the well-known fractional order chaotic systems, such as:- Chen's system,- Arneodo's system,- Genesio-Tesi's system,- Lorenz's system,- Newton-Leipnik's system,- Rossler's system,- Lotka-Volterra system,- Duffing's system,- Van der Pol's oscillator,- Volta's system,- Lu's system,- Liu's system,- Chua's systems,- Financial system,- 3 cells CNN.The functions numerically compute a solution of the fractional nonlinear differential equations, which describe the chaotic system. Each function returns the state trajectory (attractor) for total simulation time.For more details see book:Ivo Petras, Fractional-Order Nonlinear Systems: Modeling, Analysis and Simulation, Springer, Series: Nonlinear Physical Science, 2011, ISBN 978-3-642-18100-9.http://www.springer.com/engineering/contro...8-3-642-18100-9or Chinese edition:Higher Education Press, Series: Nonlinear Physical Science, 2011, ISBN 978-7-04-031534-9.http://academic.hep.com.cn/mh/nps/index.html

 Requirements: No special requirements Platforms: Matlab Keyword: Attractor,  Details,  Differential,  Equations,  Fractionalorder,  Nonlinear,  Petras,  Simulation,  Total,  Trajectory Users rating: 0/10

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