Last updated
2025-05-11T19:08:29.097+01:00
Abstract
In this research work, we present new results for a chaotic jerk system
with three quadratic terms and carry out a detailed dynamical analysis of the new
jerk system using bifurcation diagrams and Lyapunov exponents. A linear stability
analysis for the new chaotic jerk system shows the possibility of codimension-1,
codimension-2 and codimension-3 bifurcations, depending on the values of the system parameters. We also derive new results for the multistability and coexistence
of attractors for the new chaotic jerk system. Finally, using the NI Multisim 14.2
platform, the states of the chaotic jerk system are simulated via oscilloscope XSC1
and Tektronix oscilloscope.
with three quadratic terms and carry out a detailed dynamical analysis of the new
jerk system using bifurcation diagrams and Lyapunov exponents. A linear stability
analysis for the new chaotic jerk system shows the possibility of codimension-1,
codimension-2 and codimension-3 bifurcations, depending on the values of the system parameters. We also derive new results for the multistability and coexistence
of attractors for the new chaotic jerk system. Finally, using the NI Multisim 14.2
platform, the states of the chaotic jerk system are simulated via oscilloscope XSC1
and Tektronix oscilloscope.
Symplectic ID
2041624
Submitted to ORA
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