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Chaotic threshold for non-smooth system with multiple impulse effect - MaRDI portal

Chaotic threshold for non-smooth system with multiple impulse effect

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Publication:345582

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DOI10.1007/s11071-016-2800-7zbMath1349.37036OpenAlexW2342787669MaRDI QIDQ345582

Yufeng Zhou, Yanzhao Wang, Xinwei Yang, Ruilan Tian, Wenjie Feng

Publication date: 2 December 2016

Published in: Nonlinear Dynamics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1007/s11071-016-2800-7

zbMATH Keywords

chaos Melnikov method impulsive differential system non-smooth homoclinic orbit

Mathematics Subject Classification ID

Ordinary differential equations with impulses (34A37) Strange attractors, chaotic dynamics of systems with hyperbolic behavior (37D45) Complex behavior and chaotic systems of ordinary differential equations (34C28) Homoclinic and heteroclinic orbits for dynamical systems (37C29) Homoclinic and heteroclinic solutions to ordinary differential equations (34C37)

Related Items (12)

Global dynamics of a pipe conveying pulsating fluid in primary parametrical resonance: analytical and numerical results from the nonlinear wave equation ⋮ Chaos of the Rayleigh-Duffing oscillator with a non-smooth periodic perturbation and harmonic excitation ⋮ Melnikov-type method for chaos in a class of hybrid piecewise-smooth systems with impact and noise excitation under unilateral rigid constraint ⋮ Global dynamics for a class of tristable system with negative stiffness ⋮ Viscoelastic string-beam coupled vibro-impact system: modeling and dynamic analysis ⋮ Subharmonic Bifurcation for a Nonsmooth Oscillator ⋮ Heteroclinic Chaotic Threshold in a Nonsmooth System with Jump Discontinuities ⋮ Random Disordered Periodical Input Induced Chaos in Discontinuous Systems ⋮ Global Dynamics of an Elliptically Excited Pendulum Model ⋮ Global bifurcations and chaos of a composite laminated cylindrical shell in supersonic air flow ⋮ Subharmonic resonance and chaos for a class of vibration isolation system with two pairs of oblique springs ⋮ Homoclinic bifurcation for a bi-stable piezoelectric energy harvester subjected to galloping and base excitations

Cites Work

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