Litcius/Paper detail

Characteristic analysis of a simple fractional-order chaotic system with infinitely many coexisting attractors and Its DSP implementation

Xiaolin Ye, Xingyuan Wang

2020Physica Scripta25 citationsDOIOpen Access PDF

Abstract

Abstract A new simple third-order chaotic system is proposed. The numerical solution of the proposed chaotic system is calculated by using the Adomian decomposition method. The phenomena of infinitely many coexisting attractors is found in this new chaotic system. This interesting physical phenomenon don’t disappear after fractional-order processing. Conversely, with the order of fractional-order system changes, it shows more complex dynamical characteristic than the original system. In particular, the dynamical behavior of the new fractional-order system is analyzed by using the methods of bifurcation diagram, complexity. Finally, the chaotic attractors are physically implemented by DSP experiment. An extremely simple chaotic system as the demonstration of the fractional-order characteristic, it is of great significance to the application of the special chaotic system in related fields.

Topics & Concepts

AttractorChaoticSimple (philosophy)Adomian decomposition methodBifurcation diagramStatistical physicsBifurcationOrder (exchange)Fractional-order systemComputer scienceDynamical system (definition)Dynamical systems theoryApplied mathematicsMathematicsPhysicsFractional calculusNonlinear systemMathematical analysisArtificial intelligenceQuantum mechanicsEpistemologyEconomicsFinancePhilosophyChaos control and synchronizationQuantum chaos and dynamical systemsChaos-based Image/Signal Encryption
Characteristic analysis of a simple fractional-order chaotic system with infinitely many coexisting attractors and Its DSP implementation | Litcius