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Stickiness and recurrence plots: An entropy-based approach

Matheus Rolim Sales, Michele Mugnaine, José D. Szezech, Ricardo L. Viana, Iberê L. Caldas, Norbert Marwan, Jürgen Kurths

2023Chaos An Interdisciplinary Journal of Nonlinear Science22 citationsDOIOpen Access PDF

Abstract

The stickiness effect is a fundamental feature of quasi-integrable Hamiltonian systems. We propose the use of an entropy-based measure of the recurrence plots (RPs), namely, the entropy of the distribution of the recurrence times (estimated from the RP), to characterize the dynamics of a typical quasi-integrable Hamiltonian system with coexisting regular and chaotic regions. We show that the recurrence time entropy (RTE) is positively correlated to the largest Lyapunov exponent, with a high correlation coefficient. We obtain a multi-modal distribution of the finite-time RTE and find that each mode corresponds to the motion around islands of different hierarchical levels.

Topics & Concepts

Lyapunov exponentIntegrable systemChaoticMathematicsStatistical physicsRecurrence relationEntropy (arrow of time)ModalMathematical analysisPhysicsComputer scienceQuantum mechanicsArtificial intelligenceMaterials sciencePolymer chemistryQuantum chaos and dynamical systemsProtein Structure and DynamicsChaos control and synchronization
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