Bowen Liu——Solutions of the Generalized Lennard-Jones Systems

发布时间:2017-01-10浏览次数:1077


题目Solutions of the Generalized Lennard-Jones Systems


报告人Bowen Liu


时间:1月10日,14:40-15:15


地点:格物楼522学术报告厅


摘要In this paper, we study solution structures of the following generalized Lennard-Jones systems in Rn. Considering periodic solutions with zero angular momentums, we prove that the corresponding problem degenerates to 1-dimensional and possesses in nitely many periodic solutions which must be oscillating line solutions or constant solutions. Considering solutions with non-zero angular momentums, we compute Morse indices of the circular solutions first, and then apply the mountain pass theorem to show the existence of non-circular solutions with non-zero topological degrees. Then we further prove that besides circular solutions the system possesses in fact countably many periodic solutions with arbitrarily large topological degree, infinitely many quasi-periodic solutions, and infinitely many asymptotic solutions. This is a joint work with Professor Yiming Long and Professor Chongchun Zeng.


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