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Chaos in the discrete memristor-based system with fractional-order difference

Yuexi Peng, Shaobo He, Kehui Sun

2021Results in Physics108 citationsDOIOpen Access PDF

Abstract

The mathematical modeling of memristor in discrete-time domain is an attractive new issue, but there are still some problems to be explored. This paper studies an interesting second-order memristor-based map model, and the model is constructed to three systems based on Caputo fractional-order difference. Their dynamic behaviors are investigated by the volt–ampere curve, bifurcation diagram, maximum Lyapunov exponent, attractor phase diagram, complexity analysis and basin of attraction. Numerical simulation analysis shows that the fractional-order system exhibits quasi periodic, chaos, coexisting attractors and other complex behaviors, which demonstrates more abundant dynamic behaviors of the fractional-order form. It lays a good foundation for the future analysis or engineering application of the discrete memristor.

Topics & Concepts

MemristorAttractorBifurcation diagramLyapunov exponentBifurcationDomain (mathematical analysis)Order (exchange)MathematicsStatistical physicsApplied mathematicsControl theory (sociology)Computer scienceMathematical analysisPhysicsNonlinear systemChaoticArtificial intelligenceQuantum mechanicsControl (management)FinanceEconomicsNeural Networks Stability and Synchronizationstochastic dynamics and bifurcationAdvanced Memory and Neural Computing
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