Hopf bifurcation and heteroclinic orbit in a 3D autonomous chaotic system
DOI10.1007/s11071-013-0815-xzbMath1281.34072OpenAlexW2055546615MaRDI QIDQ2435650
Publication date: 19 February 2014
Published in: Nonlinear Dynamics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11071-013-0815-x
Hopf bifurcationheteroclinic orbitproject method3D autonomous chaotic systemLyapunov functional-like
Lyapunov and storage functions (93D30) Bifurcation theory for ordinary differential equations (34C23) Complex behavior and chaotic systems of ordinary differential equations (34C28) Homoclinic and heteroclinic solutions to ordinary differential equations (34C37)
Related Items (15)
Cites Work
- Unnamed Item
- Heteroclinic orbits in the \(T\) and the Lü systems
- Stability and Hopf bifurcation analysis of a new system
- Dynamics of a new Lorenz-like chaotic system
- Elements of applied bifurcation theory.
- The diffusionless Lorenz equations; Shil'nikov bifurcations and reduction to an explicit map
- The Lorenz equations: bifurcations, chaos, and strange attractors
- Dynamical properties and simulation of a new Lorenz-like chaotic system
- On the generalized Lorenz canonical form
- HOMOCLINIC AND HETEROCLINIC ORBITS AND BIFURCATIONS OF A NEW LORENZ-TYPE SYSTEM
- A UNIFIED LORENZ-TYPE SYSTEM AND ITS CANONICAL FORM
- ON HOMOCLINIC AND HETEROCLINIC ORBITS OF CHEN'S SYSTEM
- A CHAOTIC SYSTEM WITH ONE SADDLE AND TWO STABLE NODE-FOCI
- Homoclinic and heteroclinic orbits in the double scroll attractor
- YET ANOTHER CHAOTIC ATTRACTOR
- Deterministic Nonperiodic Flow
- ON A GENERALIZED LORENZ CANONICAL FORM OF CHAOTIC SYSTEMS
- A NEW CHAOTIC ATTRACTOR COINED
- Shil'nikov's theorem-a tutorial
This page was built for publication: Hopf bifurcation and heteroclinic orbit in a 3D autonomous chaotic system
