Chaotic Dynamics by Some Quadratic Jerk Systems

Chaotic Dynamics by Some Quadratic Jerk Systems

Blog Article

This paper is about the dynamical evolution of a family of chaotic jerk systems, which have different attractors for varying values of parameter a.By using Hopf bifurcation analysis, bifurcation diagrams, Lyapunov essie iced out top coat exponents, and cross sections, both self-excited and hidden attractors are explored.The self-exited chaotic attractors are found via a supercritical Hopf bifurcation and period-doubling cascades to chaos.

The hidden chaotic attractors (related to a subcritical Hopf bifurcation, and with a unique stable equilibrium) are also found via period-doubling cascades to chaos.A circuit caruso rhodiola implementation is presented for the hidden chaotic attractor.The methods used in this paper will help understand and predict the chaotic dynamics of quadratic jerk systems.