Limit cycles for two classes of planar polynomial differential systems with uniform isochronous centers |
| |
| Authors: | Bo Huang and Wei Niu |
| |
| Affiliation: | School of Mathematics and Systems Science, Beihang University and Sino-French Engineer School, Beihang University, Beijing, 100191, China |
| |
| Abstract: | In this article, we study the maximum number of limit cycles for two classes of planar polynomial differential systems with uniform isochronous centers. Using the first-order averaging method, we analyze how many limit cycles can bifurcate from the period solutions surrounding the centers of the considered systems when they are perturbed inside the class of homogeneous polynomial differential systems of the same degree. We show that the maximum number of limit cycles, $m$ and $m+1$, that can bifurcate from the period solutions surrounding the centers for the two classes of differential systems of degree $2m$ and degree $2m+1$, respectively. Both of the bounds can be reached for all $m$. |
| |
| Keywords: | Averaging method homogeneous polynomial limit cycle period solutions uniform isochronous center. |
|
| 点击此处可从《Journal of Applied Analysis & Computation》浏览原始摘要信息 |
|
点击此处可从《Journal of Applied Analysis & Computation》下载免费的PDF全文 |
|
