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【学术报告】2018年6月15日上午赵育林教授来我院举办学术讲座

2018-06-06 11:17:26    浏览次数:

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报告人:赵育林(中山大学)

报告题目:Global dynamics for a predator-prey system of Leslie type with generalized Holling type III functional response

报告摘要In this talk, as a complement to the works by Hsu et al [SIAM. J. Appl. Math. 55 (1995)] and Huang et al [J. Differential Equations 257 (2014)], aims to examine the Hopf bifurcation and global dynamics of a predator-prey model of Leslie type with generalized Holling type III functional response for the two cases: (A) when it has a unique non-degenerate positive equilibrium; (B) when it has three distinct positive equilibria. For each case, the type and stability of each equilibrium, Hopf bifurcation at each weak focus, and the number and distribution of limit cycles in the first quadrant are studied. It is shown that every equilibrium is not a center. For the case (A), $i$ limit cycle(s) can appear near the unique positive equilibrium, $i=1, \cdots, 4$. For $i=3$ or $4$, the model has two stable limit cycles, which gives a positive answer to the open problem proposed by Coleman [Differential equations model,1983]: finding at least two ecologically stable cycles in any natural (or laboratory) predator-prey system. For the case (B), one positive equilibrium is a saddle and the others are both anti-saddle. If one of the two anti-saddles is weak focus and the other is not, then the order of the weak focus is at most $3$. If both anti-saddles are weak foci, then they are unstable weak foci of order one. Moreover, one limit cycle can bifurcate from each of them simultaneously. Numerical simulations demonstrate  that there is also a big stable limit cycle enclosing these two limit cycles. Our results indicate that the maximum number of limit cycles in the model of this kind is at least $4$, which improves the preceding results that this number is at least $2$.

报告人简介:赵育林教授系中山大学教授、博士生导师,现任中山大学数学学院(珠海)院长、主持过多项国家自然科学基金面上项目,发表了几十篇高水平的学术论文,在多个国家交流访问过,主要从事动力系统和非线性微分方程的研究。

报告时间:2018年6月15日(星期五)上午9:30-10:30

报告地点:科技楼南702