Highly Complex Chaotic System with Piecewise Linear Nonlinearity and Compound Structures

Wimol San-Um; Banlue Srisuchinwong
April 2012
Journal of Computers;Apr2012, Vol. 7 Issue 4, p1041
Academic Journal
A new chaotic system is presented using a single parameter for a two-scroll attractor with high complexity, high chaoticity and widely chaotic range. The system employs two quadratic nonlinearities and two piecewiselinear nonlinearities. The high chaoticity is measured by the the maximum Lyapunov Exponent of 0.429 and the high complexity is measured by the Kaplan-Yorke dimension of 2.3004. Dynamic properties are described in terms of symmetry, a dissipative system, an existence of attractor, equilibria, Jacobian matrices, bifurcations, Poincaroé maps, chaotic waveforms, chaotic spectrum, and forming mechanisms of compound structures.


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