摘要
In this paper, we study solution structures of the following generalized Lennard-Jones system in R^n,x(-α/|x|α+2+β/|x|β+2)xwith 0 〈 α 〈β. Considering periodic solutions with zero angular momentum, we prove that the corre- sponding problem degenerates to I-dimensional and possesses infinitely many periodic solutions which must be oscillating line solutions or constant solutions. Considering solutions with non-zero angular momentum, 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. 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.
In this paper, we study solution structures of the following generalized Lennard-Jones system in R^n,x(-α/|x|α+2+β/|x|β+2)xwith 0 〈 α 〈β. Considering periodic solutions with zero angular momentum, we prove that the corre- sponding problem degenerates to I-dimensional and possesses infinitely many periodic solutions which must be oscillating line solutions or constant solutions. Considering solutions with non-zero angular momentum, 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. 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.
基金
partially supported by the Ph.D.Candidate Research Innovation Fund of Nankai University and NSFC(Grant Nos.11131004 and 11671215)
partially supported by NSFC(Grant Nos.11131004 and 11671215)
LPMC of MOE of China
Nankai University
the BAICIT at Capital Normal University
partially supported by US NSF(Grant DMS-1362507)
