陈和柏

特聘教授 博士生导师 硕士生导师

入职时间:2019-07-02

所在单位:数学与统计学院

学历:博士研究生毕业

办公地点:数学与统计学院451办公室

性别:男

学位:博士学位

在职信息:在职

毕业院校:西南交通大学

学科:数学

曾获荣誉:

福建省引进高层次人才,福州大学旗山学者

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Crossing periodic orbits of nonsmooth Lienard systems and applications

发布时间:2020-10-06

点击次数:

DOI码:10.1088/1361-6544/ab9bac

发表刊物:Nonlinearity

刊物所在地:UK

关键字:discontinuity, Li ́enard system, limit cycle, piecewise linear system

摘要:Continuing the investigation for the number of crossing periodic orbits of non- smooth Li ́enard systems in (2008 Nonlinearity 21 2121–42) for the case of a unique equilibrium, in this paper we allow the considered system to have one or multiple equilibria. By constructing two control functions that are decreasing in a much narrower interval than the one used in the above work in the estimate of divergence integrals, we overcome the difficulty of comparing the heights of orbital arcs caused by the multiplicity of equilibria and give results about the existence and uniqueness of crossing periodic orbits, which hold not only for a unique equilibrium but also for multiple equilibria. Moreover, we find a sufficient condition for the existence of periodic annuli formed by crossing periodic orbits. Applying our results to planar piecewise linear systems with a line of discontinuity and without sliding sets, we prove the uniqueness of crossing limit cycles and hence give positive answers to conjectures 1 and 2 of Freire et al’s work (2013 Planar Filippov Systems with Maximal Crossing Set and Piecewise Linear Focus Dynamics (Progress and Challenges in Dynamical Systems vol 54) (Heidelberg: Springer) pp 221–32).

合写作者:Chen Hebai, Chen Xingwu

第一作者:Li Tao

论文类型:期刊论文

学科门类:数学

文献类型:J

卷号:33

期号:11

页面范围:5817-5838

是否译文:

收录刊物:SCI

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