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Limit cycle bifurcations of piecewise smooth near-Hamiltonian systems with a switching curve

发布时间:2019-09-17 作者: 浏览次数:
Speaker: 韩茂安 DateTime: 2019年9月19日(周四)上 午 9:30-10:30
Brief Introduction to Speaker:

韩茂安,上海师范大学,教授。

Place: 六号楼二楼会议室
Abstract:This paper deals with the number of limit cycles for planar piecewise smooth near-Hamiltoian or near-integrable systems with a switching curve. The main task is to establish a so-called first order Melnikov function which plays a crucial role in the study of the number of limit cycles bifurcated from a periodic annulus. We use the function to study Hopf bifurcation when the periodic annulus has an elementary center as its boundary. As applications, using the first order Melnikov function, we consider the number of limit cycles bifurcated from the periodic annulus of a linear center under piecewise linear polynomial perturbations with three kinds of quadratic switching curves. And we obtain 3 limit cycles for each case.