Limit Cycle Bifurcations of a Cubic Polynomial System via Melnikov Analysis
Abstract
In this paper, a linear perturbation up to any order in $\epsilon$ for a cubic center with a multiple line of critical points is considered. By the algorithm of any order Melnikov function, the sharp upper bound of the number of limit cycles is 2.
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How to Cite
Limit Cycle Bifurcations of a Cubic Polynomial System via Melnikov Analysis. (2024). Journal of Nonlinear Modeling and Analysis, 6(3), 683-692. https://doi.org/10.12150/jnma.2024.683