Hopf Bifurcation of Z2-Equivariant Generalized Liénard Systems
DOI10.1142/S0218127418500694zbMath1394.34030OpenAlexW2808782569MaRDI QIDQ4576019
Yusen Wu, Laigang Guo, Yu-Fu Chen
Publication date: 12 July 2018
Published in: International Journal of Bifurcation and Chaos (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0218127418500694
Topological structure of integral curves, singular points, limit cycles of ordinary differential equations (34C05) Transformation and reduction of ordinary differential equations and systems, normal forms (34C20) Nonlinear ordinary differential equations and systems (34A34) Symmetries, invariants of ordinary differential equations (34C14) Theory of limit cycles of polynomial and analytic vector fields (existence, uniqueness, bounds, Hilbert's 16th problem and ramifications) for ordinary differential equations (34C07)
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Cites Work
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- New results on the study of \(Z_q\)-equivariant planar polynomial vector fields
- Limit cycle bifurcations of some Liénard systems with a cuspidal loop and a homoclinic loop
- Limit cycles of some polynomial Liénard systems
- Normal forms, Melnikov functions and bifurcations of limit cycles
- On the structure of Poincaré-Lyapunov constants for the weak focus of polynomial vector fields
- Limit cycles in generalized Liénard systems
- Estimating the number of limit cycles in polynomial systems
- A cubic system with thirteen limit cycles
- Nonlinear oscillations, dynamical systems, and bifurcations of vector fields
- An algebraic approach to the classification of centers in polynomial Liénard systems
- Implementation of a new algorithm of computation of the Poincaré-Lyapunov constants.
- Center conditions for polynomial Liénard systems
- Limit cycle bifurcations of some Liénard systems
- A new approach to the computation of the Lyapunov constants
- THE NUMBER OF LIMIT CYCLES IN A Z2-EQUIVARIANT LIÉNARD SYSTEM
- AN EXPLICIT RECURSIVE FORMULA FOR COMPUTING THE NORMAL FORM AND CENTER MANIFOLD OF GENERAL n-DIMENSIONAL DIFFERENTIAL SYSTEMS ASSOCIATED WITH HOPF BIFURCATION
- COMPUTATION OF NORMAL FORMS VIA A PERTURBATION TECHNIQUE
- The number of small-amplitude limit cycles of Liénard equations
- Degenerate Hopf Bifurcation Formulas and Hilbert’s 16th Problem
- Bifurcation Theory and Methods of Dynamical Systems
- Bifurcations of limit cycles from quintic Hamiltonian systems with a double figure eight loop
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