Chaotic Dynamics by Some Quadratic Jerk Systems
Abstract
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 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...
Paper Details
Title
Chaotic Dynamics by Some Quadratic Jerk Systems
Published Date
Sep 14, 2021
Journal
Volume
10
Issue
3
Pages
227 - 227
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