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Chaos and control of a three-dimensional fractional order discrete-time system with no equilibrium and its synchronization

Adel Ouannas, Amina–Aicha Khennaoui, Shaher Momani, Giuseppe Grassi, Viet–Thanh Pham

2020AIP Advances75 citationsDOIOpen Access PDF

Abstract

Chaotic systems with no equilibrium are a very important topic in nonlinear dynamics. In this paper, a new fractional order discrete-time system with no equilibrium is proposed, and the complex dynamical behaviors of such a system are discussed numerically by means of a bifurcation diagram, the largest Lyapunov exponents, a phase portrait, and a 0–1 test. In addition, a one-dimensional controller is proposed. The asymptotic convergence of the proposed controller is established by means of the stability theory of linear fractional order discrete-time systems. Next, a synchronization control scheme for two different fractional order discrete-time systems with hidden attractors is reported, where the master system is a two-dimensional system that has been reported in the literature. Numerical results are presented to confirm the results.

Topics & Concepts

Phase portraitLyapunov exponentAttractorSynchronization (alternating current)Controller (irrigation)Nonlinear systemBifurcation diagramConvergence (economics)Synchronization of chaosControl theory (sociology)ChaoticMathematicsEquilibrium pointApplied mathematicsDiscrete time and continuous timeLyapunov stabilityBifurcationStatistical physicsComputer scienceMathematical analysisPhysicsTopology (electrical circuits)Control (management)Differential equationStatisticsEconomicsEconomic growthCombinatoricsArtificial intelligenceBiologyAgronomyQuantum mechanicsChaos control and synchronizationNonlinear Dynamics and Pattern Formationstochastic dynamics and bifurcation