A New 4-D Hyperchaotic Two-Wing System with a Unique Saddle-Point Equilibrium at the Origin, its Bifurcation Analysis and Circuit Simulation

Author: 

Vaidyanathan, S
Moroz, I
Sambas, A
Mujiarto
Sanjaya, W

Publication Date: 

1 May 2020

Journal: 

Journal of Physics: Conference Series

Last Updated: 

2020-10-15T12:50:39.44+01:00

Issue: 

2

Volume: 

1477

DOI: 

10.1088/1742-6596/1477/2/022016

abstract: 

© Published under licence by IOP Publishing Ltd. A new 4-D hyperchaotic two-wing system with three quadratic nonlinearities is proposed in this paper. The dynamical properties of the new hyperchaotic system are described in terms of phase portraits, Lyapunov exponents, Kaplan-Yorke dimension, symmetry, dissipativity, etc. Also, a detailed dynamical bifurcation analysis of the hyperchaotic system has been studied using bifurcation diagrams. As an engineering application, an electronic circuit realization of the new hyperchaotic two-wing system is developed in MultiSIM, which confirms the feasibility of the theoretical hyperchaotic two-wing system.

Symplectic id: 

1103590

Submitted to ORA: 

Submitted

Publication Type: 

Conference Paper