Local bifurcation of limit cycles and integrability of a class of nilpotent systems of differential equations

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摘要

We study the analytic system of differential equations in the plane which can be written, in a suitable coordinates system, aswhere and are quasi-homogeneous vector fields of type and degree i, with and . The origin of this system is a nilpotent and monodromic isolated singular point. We show the Taylor expansion of the return map near the origin for this system, which allow us to generate small amplitude limit cycles bifurcating from the critical point. Also, as an application of the theoretical procedure, we characterize the centers and we generate limit cycles of small amplitude from the origin of several families. Finally, we give a new family integrable analytically which includes the centers of the systems studied.

论文关键词:Limit cycles,Center,Nilpotent systems

论文评审过程:Available online 13 May 2009.

论文官网地址:https://doi.org/10.1016/j.amc.2009.04.077