Frontiers of Mathematics in China >
Minimal period estimates on P-symmetric periodic solutions of first-order mild superquadratic Hamiltonian systems
Received date: 31 Aug 2020
Accepted date: 31 Jan 2021
Published date: 15 Feb 2021
Copyright
With the aid of P-index iteration theory, we consider the minimal period estimates on P-symmetric periodic solutions of nonlinear P-symmetric Hamiltonian systems with mild superquadratic growth.
Key words: Hamiltonian system; P-symmetric periodic solution; P-index; minimal period
Xiaofei ZHANG , Chungen LIU . Minimal period estimates on P-symmetric periodic solutions of first-order mild superquadratic Hamiltonian systems[J]. Frontiers of Mathematics in China, 2021 , 16(1) : 239 -253 . DOI: 10.1007/s11464-021-0903-z
| 1 |
Abbondandolo A. Index estimates for strongly indefinite functionals, periodic orbits and homoclinic solutions of first order Hamiltonian systems. Calc Var Partial Differential Equations, 2000, 11: 395–430
|
| 2 |
Abbondandolo A. Morse Theory for Hamiltonian Systems. Chapman & Hall/CRC Res Notes in Math, Vol 425. London: Chapman & Hall/CRC, 2001
|
| 3 |
Chenciner A, Montgomery R. A remarkable periodic solution of the three body problem in the case of equal masses. Ann of Math, 2000, 152: 881–901
|
| 4 |
Dong D, Long Y M. The iteration formula of the Maslov-type index theory with applications to nonlinear Hamiltonian systems. Trans Amer Math Soc, 1997, 349: 2619–2661
|
| 5 |
Dong Y J. P-index theory for linear Hamiltonian systems and multiple solutions for nonlinear Hamiltonian systems. Nonlinearity, 2006, 19: 1275–1294
|
| 6 |
Ekeland I, Hofer H. Periodic solutions with prescribed minimal period for convex autonomous Hamiltonian systems. Invent Math, 1985, 81: 155–188
|
| 7 |
Hu X J, Sun S Z. Index and stability of symmetric periodic orbits in Hamiltonian systems with application to figure-eight orbit. Comm Math Phys, 2009, 290: 737–777
|
| 8 |
Hu X J, Sun S Z. Stability of relative equilibria and Morse index of central configurations. C R Acad Sci Paris, Ser I, 2009, 347: 1309–1312
|
| 9 |
Hu X J, Sun S Z. Morse index and the stability of closed geodesics. Sci China Math, 2010, 53: 1207–1212
|
| 10 |
Liu C G. Maslov P-index theory for a symplectic path with applications. Chin Ann Math Ser B, 2006, 27(4): 441–458
|
| 11 |
Liu C G. Periodic solutions of asymptotically linear delay differential systems via Hamiltonian systems. J Differential Equations, 2012, 252: 5712–5734
|
| 12 |
Liu C G. Relative index theories and applications. Topol Methods Nonlinear Anal, 2017, 49: 587–614
|
| 13 |
Liu C G. Index Theory in Nonlinear Analysis.Berlin/Beijing: Springer/Science Press, 2019
|
| 14 |
Liu C G, Long Y M. Iteration inequalities of the Maslov-type index theory with applications. J Differential Equations, 2000, 165: 355–376
|
| 15 |
Liu C G, Tang S S. Maslov (P, ω)-index theory for symplectic paths. Adv Nonlinear Stud, 2015, 15: 963–990
|
| 16 |
Liu C G, Tang S S. Iteration inequalities of the Maslov P-index theory with applications. Nonlinear Anal, 2015, 127: 215–234
|
| 17 |
Liu C G, Tang S S. Subharmonic Pl-solutions of first order Hamiltonian systems. J Math Anal Appl, 2017, 453: 338–359
|
| 18 |
Liu C G, Zhou B X. Minimal P-symmetric period problem of first-order autonomous Hamiltonian systems. Front Math China, 2017, 12(3): 641–654
|
| 19 |
Long Y M. Index Theory for Symplectic Paths with Applications. Progr Math, Vol 207. Basel: Birkhauser Verlag, 2002
|
| 20 |
Rabinowitz P H. Periodic solutions of Hamiltonian systems. Comm Pure Appl Math, 1978, 31: 157–184
|
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