Litcius/Paper detail

Heteroclinic Chaotic Threshold in a Nonsmooth System with Jump Discontinuities

R. L. Tian, Tian Wang, Yufeng Zhou, J. Li, Shaotao Zhu

2020International Journal of Bifurcation and Chaos24 citationsDOI

Abstract

In smooth systems, the form of the heteroclinic Melnikov chaotic threshold is similar to that of the homoclinic Melnikov chaotic threshold. However, this conclusion may not be valid in nonsmooth systems with jump discontinuities. In this paper, based on a newly constructed nonsmooth pendulum, a kind of impulsive differential system is introduced, whose unperturbed part possesses a nonsmooth heteroclinic solution with multiple jump discontinuities. Using the recursive method and the perturbation principle, the effects of the nonsmooth factors on the behaviors of the nonsmooth dynamical system are converted to the integral items which can be easily calculated. Furthermore, the extended Melnikov function is employed to obtain the nonsmooth heteroclinic Melnikov chaotic threshold, which implies that the existence of the nonsmooth heteroclinic orbits may be due to the breaking of the nonsmooth heteroclinic loops under the perturbation of damping, external forcing and nonsmooth factors. It is worth pointing out that the form of the nonsmooth heteroclinic Melnikov function is different from the one of the nonsmooth homoclinic Melnikov function, which is quite different from the classical Melnikov theory.

Topics & Concepts

Homoclinic orbitHeteroclinic cycleHeteroclinic orbitClassification of discontinuitiesMathematicsChaoticJumpPerturbation (astronomy)Heteroclinic bifurcationMathematical analysisNonlinear systemPhysicsBifurcationComputer scienceArtificial intelligencePeriod-doubling bifurcationQuantum mechanicsQuantum chaos and dynamical systemsChaos control and synchronizationAdvanced Differential Equations and Dynamical Systems
Heteroclinic Chaotic Threshold in a Nonsmooth System with Jump Discontinuities | Litcius