Coexistence of three heteroclinic cycles and chaos analyses for a class of 3D piecewise affine systems
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Publication:6572661
DOI10.1063/5.0132018MaRDI QIDQ6572661
Fanrui Wang, Zhouchao Wei, Wei Zhang, I. M. Moroz
Publication date: 16 July 2024
Published in: Chaos (Search for Journal in Brave)
Cites Work
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- A new class of 3-dimensional piecewise affine systems with homoclinic orbits
- Chaos generator design with piecewise affine systems
- Fishing principle for homoclinic and heteroclinic trajectories
- On the existence of heteroclinic cycles in some class of 3-dimensional piecewise affine systems with two switching planes
- The Melnikov method for detecting chaotic dynamics in a planar hybrid piecewise-smooth system with a switching manifold
- Homoclinic orbits and an invariant chaotic set in a new 4D piecewise affine systems
- Chaos in three-dimensional hybrid systems and design of chaos generators
- Hopf and homoclinic bifurcations on the sliding vector field of switching systems in \(\mathbb{R}^3\): a case study in power electronics
- Existence of periodic orbits and chaos in a class of three-dimensional piecewise linear systems with two virtual stable node-foci
- Coexisting singular cycles in a class of three-dimensional three-zone piecewise affine systems
- Periodic sinks and periodic saddle orbits induced by heteroclinic bifurcation in three-dimensional piecewise linear systems with two zones
- Heteroclinic cycles and chaos in a class of 3D three-zone piecewise affine systems
- Heteroclinic cycles in a class of 3-dimensional piecewise affine systems
- Generating Shilnikov chaos in 3D piecewise linear systems
- Existence of homoclinic orbits and heteroclinic cycle in a class of three-dimensional piecewise linear systems with three switching manifolds
- HORSESHOES NEAR HOMOCLINIC ORBITS FOR PIECEWISE LINEAR DIFFERENTIAL SYSTEMS IN ℝ3
- Chaotic Dynamics in Four-Dimensional Piecewise Affine Systems with Bifocal Heteroclinic Cycles
- Existence of Homoclinic Cycles and Periodic Orbits in a Class of Three-Dimensional Piecewise Affine Systems
- Introduction to Applied Nonlinear Dynamical Systems and Chaos
- Shil'nikov's theorem-a tutorial
- Shilnikov chaos, Filippov sliding and boundary equilibrium bifurcations
- Sliding homoclinic bifurcations in a Lorenz-type system: Analytic proofs
- Heteroclinic Cycles Generated by Piecewise Affine Systems in ℝn
- Nonlinear Behavior of a Novel Switching Jerk System
- Hidden Attractors and Dynamical Behaviors in an Extended Rikitake System
- On the existence of bifocal heteroclinic cycles in a class of four-dimensional piecewise affine systems
- Singular cycles and chaos in a new class of 3D three-zone piecewise affine systems
- Existence of Chaotic Invariant Set in a Class of 4-Dimensional Piecewise Linear Dynamical Systems
Related Items (3)
Two-parameter bifurcations and hidden attractors in a class of 3D linear Filippov systems ⋮ Investigation of an improved FitzHugh-Rinzel neuron and its multiplier-less circuit implementation ⋮ Coexistence of singular cycles in a class of three-dimensional piecewise affine systems
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