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Dynamics of a New Multistable 4D Hyperchaotic Lorenz System and Its Applications

Gervais Dolvis Leutcho, Huihai Wang, Théophile Fonzin Fozin, Kehui Sun, Zeric Tabekoueng Njitacke, Jacques Kengne

2022International Journal of Bifurcation and Chaos43 citationsDOI

Abstract

Using an effective nonlinear feedback controller, a novel 4D hyperchaotic Lorenz system is built. Dynamical analyses show that it has interesting properties. Using some well-known analysis tools like Lyapunov spectrum, bifurcation analysis, chaos diagram, and phase space trajectories, it is found that several bifurcations enable the hyperchaotic dynamics to occur in the introduced model. Also, many windows of heterogeneous multistability are found in the parameter space (i.e. coexistence of a pair of chaotic attractors, coexistence of a periodic and a chaotic attractor). Besides, DSP implementation is successfully used to support the results of the theoretical prediction. Finally, a judicious image encryption algorithm based on the hyperchaotic Lorenz system is proposed with detailed analysis. The effectiveness of the proposed approach is confirmed via several security analyses, which yields a secure image encryption application.

Topics & Concepts

MultistabilityAttractorEncryptionChaoticLorenz systemBifurcation diagramPhase spaceControl theory (sociology)Parameter spaceNonlinear systemComputer scienceBifurcationLyapunov exponentController (irrigation)MathematicsStatistical physicsArtificial intelligenceMathematical analysisControl (management)PhysicsOperating systemBiologyAgronomyThermodynamicsQuantum mechanicsStatisticsChaos control and synchronizationChaos-based Image/Signal EncryptionCellular Automata and Applications
Dynamics of a New Multistable 4D Hyperchaotic Lorenz System and Its Applications | Litcius