Archives of Control Sciences (Jul 2024)

A new chaotic jerk system with a sinusoidal nonlinearity, its bifurcation analysis, multistability, circuit design and complete synchronization design via backstepping control

  • Sundarapandian VaidyanathaN,
  • Fareh Hannachi,
  • Irene M. Moroz,
  • Chittineni Aruna,
  • Mohamad Afendee Mohamed,
  • Aceng Sambas

DOI
https://doi.org/10.24425/acs.2024.149662
Journal volume & issue
Vol. vol. 34, no. No 2
pp. 301 – 322

Abstract

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In this research work, we investigate a new three-dimensional jerk system with three parameters in which one of the nonlinear terms is a sinusoidal nonlinearity. We show that the new jerk system has two unstable equilibrium points on the ��-axis. Numerical integrations show the existence of periodic and chaotic states, as well as unbounded solutions. Consideration of the Poincaré sphere at infinity found no periodic states. We show that the new jerk system exhibits multistability with coexisting attractors. We also present results for the offset boosting of the proposed chaotic jerk system. Using MultiSim version 14.1, we design an electronic circuit for the new jerk system with a sinusoidal nonlinearity. As a control application, we design complete synchronization for the master-slave jerk systems using backstepping control technique. Simulations are presented to illustrate the main results of this research work.

Keywords