Litcius/Paper detail

Coexisting Infinite Orbits in an Area-Preserving Lozi Map

Houzhen Li, Kexin Li, Mo Chen, Bocheng Bao

2020Entropy28 citationsDOIOpen Access PDF

Abstract

Extreme multistability with coexisting infinite orbits has been reported in many continuous memristor-based dynamical circuits and systems, but rarely in discrete dynamical systems. This paper reports the finding of initial values-related coexisting infinite orbits in an area-preserving Lozi map under specific parameter settings. We use the bifurcation diagram and phase orbit diagram to disclose the coexisting infinite orbits that include period, quasi-period and chaos with different types and topologies, and we employ the spectral entropy and sample entropy to depict the initial values-related complexity. Finally, a microprocessor-based hardware platform is developed to acquire four sets of four-channel voltage sequences by switching the initial values. The results show that the area-preserving Lozi map displays coexisting infinite orbits with complicated complexity distributions, which heavily rely on its initial values.

Topics & Concepts

MultistabilityChaoticBifurcation diagramMathematicsPeriodic orbitsBifurcationTopological entropyEntropy (arrow of time)Dynamical systems theoryStatistical physicsTopology (electrical circuits)AlgorithmComputer scienceMathematical analysisDiscrete mathematicsArtificial intelligencePhysicsCombinatoricsNonlinear systemQuantum mechanicsstochastic dynamics and bifurcationNeural dynamics and brain functionChaos control and synchronization
Coexisting Infinite Orbits in an Area-Preserving Lozi Map | Litcius