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MCS
2016
Springer

Limit cycles bifurcating from a degenerate center

8 years 8 months ago
Limit cycles bifurcating from a degenerate center
We study the maximum number of limit cycles that can bifurcate from a degenerate center of a cubic homogeneous polynomial differential system. Using the averaging method of second order and perturbing inside the class of all cubic polynomial differential systems we prove that at most three limit cycles can bifurcate from the degenerate center. As far as we know this is the first time that a complete study up to second order in the small parameter of the perturbation is done for studying the limit cycles which bifurcate from the periodic orbits surrounding a degenerate center (a center whose linear part is identically zero) having neither a Hamiltonian first integral nor a rational one. This study needs many computations, which have been verified with the help of the algebraic manipulator Maple.
Jaume Llibre, Chara Pantazi
Added 07 Apr 2016
Updated 07 Apr 2016
Type Journal
Year 2016
Where MCS
Authors Jaume Llibre, Chara Pantazi
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