Periodic solutions of a 2D-autonomous system using Mathematica\(^{\copyright}\)
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Publication:1029190
DOI10.1016/j.mcm.2006.07.014zbMath1165.34300OpenAlexW2061562780MaRDI QIDQ1029190
Publication date: 9 July 2009
Published in: Mathematical and Computer Modelling (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.mcm.2006.07.014
Theory of limit cycles of polynomial and analytic vector fields (existence, uniqueness, bounds, Hilbert's 16th problem and ramifications) for ordinary differential equations (34C07) Software, source code, etc. for problems pertaining to ordinary differential equations (34-04)
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- Reversibility and classification of nilpotent centers
- A new method to determine isochronous center conditions for polynomial differential systems.
- Analytic integrability and characterization of centers for generalized nilpotent singular points.
- Analytic integrability and characterization of centers for nilpotent singular points
- A new criterion for controlling the number of limit cycles of some generalized Liénard equations
- Linearization of isochronous centers
- Persistence theorems and simultaneous uniformization
- Isochronous Centers in Planar Polynomial Systems
- regularity properties of the period function near a center of a planar vector field
- Local analytic integrability for nilpotent centers
- The focus-centre problem for a type of degenerate system
- Polynomial systems: a lower bound for the Hilbert numbers
- Probleme General de la Stabilite du Mouvement. (AM-17)
- Scientific computing with \(Mathematica\). Mathematical problems for ordinary differential equations. Incl. 1 CD-ROM
- The center-focus problem and reversibility
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