Litcius/Paper detail

Complex Dynamics of a Four-Dimensional Circuit System

Haijun Wang, Hongdan Fan, Jun Pan

2021International Journal of Bifurcation and Chaos31 citationsDOI

Abstract

Combining qualitative analysis and numerical technique, the present work revisits a four-dimensional circuit system in [Ma et al., 2016] and mainly reveals some of its rich dynamics not yet investigated: pitchfork bifurcation, Hopf bifurcation, singularly degenerate heteroclinic cycle, globally exponentially attractive set, invariant algebraic surface and heteroclinic orbit. The main contributions of the work are summarized as follows: Firstly, it is proved that there exists a globally exponentially attractive set with three different exponential rates by constructing a suitable Lyapunov function. Secondly, the existence of a pair of heteroclinic orbits is also proved by utilizing two different Lyapunov functions. Finally, numerical simulations not only are consistent with theoretical results, but also illustrate potential existence of hidden attractors in its Lorenz-type subsystem, singularly degenerate heteroclinic cycles with distinct geometrical structures and nearby hyperchaotic attractors in the case of small [Formula: see text], i.e. hyperchaotic attractors and nearby pseudo singularly degenerate heteroclinic cycles, i.e. a short-duration transient of singularly degenerate heteroclinic cycles approaching infinity, or the true ones consisting of normally hyperbolic saddle-foci (or saddle-nodes) and stable node-foci, giving some kind of forming mechanism of hyperchaos.

Topics & Concepts

Heteroclinic cycleHeteroclinic orbitHeteroclinic bifurcationAttractorMathematicsDegenerate energy levelsInvariant (physics)Mathematical analysisPure mathematicsBifurcationHopf bifurcationHomoclinic orbitNonlinear systemPhysicsMathematical physicsQuantum mechanicsChaos control and synchronizationNonlinear Dynamics and Pattern Formationstochastic dynamics and bifurcation