MASLOV-TYPE INDEX, DEGENERATE CRITICAL POINTS, AND ASYMPTOTICALLY LINEAR HAMILTONIAN SYSTEMS 被引量：17

MASLOV-TYPE INDEX, DEGENERATE CRITICAL POINTS, AND ASYMPTOTICALLY LINEAR HAMILTONIAN SYSTEMS

导出

摘要 <正> This paper introduces a Maslov-type index theory for paths in the symplectic groups, especially for the degenerate paths via rotational perturbation method, therefore gives a full classification of the linear Hamiltonian systems with continuous, periodic, and symmetric coefficients. Associating this index with each periodic solution, we establish the existence of muhiple periodic solutions of asymptotically linear Hamihonian systems. This paper introduces a Maslov-type index theory for paths in the symplectic groups, especially for the degenerate paths via rotational perturbation method, therefore gives a full classification of the linear Hamiltonian systems with continuous, periodic, and symmetric coefficients. Associating this index with each periodic solution, we establish the existence of muhiple periodic solutions of asymptotically linear Hamihonian systems.

作者龙以明

机构地区 Nankai Institute of Mathematics

出处《Science China Mathematics》 SCIE 1990年第12期1409-1419,共11页 中国科学：数学（英文版）

关键词 Maslov-type index DEGENERATE critical points ROTATIONAL PERTURBATION method periodic solutions ASYMPTOTICALLY linear HAMILTONIAN systems. Maslov-type index, degenerate critical points, rotational perturbation method, periodic solutions, asymptotically linear Hamiltonian systems.

分类号 N [自然科学总论]

引文网络
相关文献

同被引文献11

1刘春根,龙以明.Iterated index formulae for closed geodesies with applications[J].Science China Mathematics,2002,45(1):9-28. 被引量：8
2LI Chong & LIU ChunGen School of Mathematical Sciences and LPMC,Nankai University,Tianjin 300071,China.Brake subharmonic solutions of first order Hamiltonian systems[J].Science China Mathematics,2010,53(10):2719-2732. 被引量：4
3ZHUCHAOFENG,LONGYIMING.MASLOV-TYPE INDEX THEORY FOR SYMPLECTIC PATHS AND SPECTRAL FLOW (Ⅰ)[J].Chinese Annals of Mathematics,Series B,1999,20(4):413-424. 被引量：7
4Fei Guihua,Qiu Qingjiu.PERIODIC SOLUTIONS OF ASYMPTOTICALLY LINEA RHAMILTONIAN SYSTEMS[J].Chinese Annals of Mathematics,Series B,1997,18(3):359-372. 被引量：7
5LONG YIMING.ON THE MINIMAL PERIOD FOR PERIODIC SOLUTION PROBLEM OF NONLINEAR HAMILTONIAN SYSTEMS[J].Chinese Annals of Mathematics,Series B,1997,18(4):481-484. 被引量：6
6ChunGenLIU.The Relation of the Morse Index of Closed Geodesics with the Maslov-type Index of Symplectic Paths[J].Acta Mathematica Sinica,English Series,2005,21(2):237-248. 被引量：6
7Chungen LIU.Maslov P-Index Theory for a Symplectic Path with Applications[J].Chinese Annals of Mathematics,Series B,2006,27(4):441-458. 被引量：6
8丁彦恒,刘嘉荃.渐近线性Hamiltonian系统的周期解[J].系统科学与数学,1989(1):30-39. 被引量：2
9Chong LI.Brake Subharmonic Solutions of Subquadratic Hamiltonian Systems[J].Chinese Annals of Mathematics,Series B,2016,37(3):405-418. 被引量：2
10Yuting ZHOU,Li WU,Chaofeng ZHU.Hormander index in finite-dimensional case[J].Frontiers of Mathematics in China,2018,13(3):725-761. 被引量：4

引证文献17

1胡锡俊,龙以明.Closed characteristics on non-degenerate star-shaped hypersurfaces in R^(2n)[J].Science China Mathematics,2002,45(8):1038-1052. 被引量：4
2Hu XiJun,Sun ShanZhong.Morse index and the stability of closed geodesics[J].Science China Mathematics,2010,53(5):170-175. 被引量：5
3ChunGenLIU.The Relation of the Morse Index of Closed Geodesics with the Maslov-type Index of Symplectic Paths[J].Acta Mathematica Sinica,English Series,2005,21(2):237-248. 被引量：6
4Chungen LIU.Maslov P-Index Theory for a Symplectic Path with Applications[J].Chinese Annals of Mathematics,Series B,2006,27(4):441-458. 被引量：6
5Chungen LIU,Qi WANG.Some Abstract Critical Point Theorems for Self-adjoint Operator Equations and Applications[J].Chinese Annals of Mathematics,Series B,2011,32(1):1-14.
6李科强.用指标理论对凸哈密顿系统周期解的一个存在性定理的推广[J].南京师大学报（自然科学版）,2011,34(1):12-18.
7李传华,冯春华.渐近线性哈密顿系统的周期解(英文)[J].玉林师范学院学报,2011,32(5):13-17.
8李翀,王信峰,郭飞.次二次Hamilton系统的次调和解(英文)[J].南开大学学报（自然科学版）,2011,44(5):27-33.
9CHENG Rong,XU JunXiang,ZHANG FuBao.Multiple periodic solutions for non-canonical Hamiltonian systems with application to differential delay equations[J].Science China Mathematics,2014,57(8):1625-1638.
10李翀.关于次二次哈密顿系统次调和解的研究(英文)[J].南开大学学报（自然科学版）,2014,47(4):59-66.

二级引证文献19

1Hu XiJun,Sun ShanZhong.Morse index and the stability of closed geodesics[J].Science China Mathematics,2010,53(5):170-175. 被引量：5
2张端智.Maslov型指标及非线性Hamilton系统中的闸轨道[J].中国科学（A辑）,2007,37(3):301-311.
3胡锡俊,孙善忠.Morse指标和闭测地线的稳定性[J].中国科学：数学,2010,40(5):415-420.
4Chungen LIU,Qi WANG.Some Abstract Critical Point Theorems for Self-adjoint Operator Equations and Applications[J].Chinese Annals of Mathematics,Series B,2011,32(1):1-14.
5金玉芝.我的父亲母亲[J].电影评介,2000(3):22-22.
6Hui LIU,Yi Ming LONG.The Existence of Two Closed Characteristics on Every Compact Star-shaped Hypersurface in R^4[J].Acta Mathematica Sinica,English Series,2016,32(1):40-53. 被引量：2
7DUAN Hua Gui,LIU Hui.Multiplicity of closed geodesics on Finsler spheres with irrationally elliptic closed geodesics[J].Science China Mathematics,2016,59(3):531-538. 被引量：1
8Chungen LIU,Benxing ZHOU.Minimal P-symmetric period problem of first-order autonomous Hamiltonian systems[J].Frontiers of Mathematics in China,2017,12(3):641-654. 被引量：3
9Hua Gui DUAN,Hui LIU,Yi Ming LONG,Wei WANG.Non-hyperbolic Closed Characteristics on Non-degenerate Star-shaped Hypersurfaces in R2n[J].Acta Mathematica Sinica,English Series,2018,34(1):1-18. 被引量：1
10Xiao Fei ZHANG,Chun Gen LIU.Brake Orbits of First Order Convex Hamiltonian Systems with Particular Anisotropic Growth[J].Acta Mathematica Sinica,English Series,2020,36(2):171-178. 被引量：1

1龙以明.THE STRUCTURE OF THE SINGULAR SYMPLECTIC MATRIX SET[J].Science China Mathematics,1991,34(8):897-907. 被引量：2
2ZHANG DuanZhi.Symmetric period solutions with prescribed minimal period for even autonomous semipositive Hamiltonian systems[J].Science China Mathematics,2014,57(1):81-96.
3慕小武,郭仲衡.A NEW CLASSIFICATION OF CONSTRAINTS OF HAMILTONIAN SYSTEMS AND THEIR SOLVABILITY[J].Science China Mathematics,1990,33(7):825-829.
4XIE Zhendong\ XIE Shengli\ LIU Yongqing Department of Automation, South China University of Technology,Guangzhou, 510641.Existence and Stability for Periodic Solution of Cooperation Ecosystem with Diffusion[J].Systems Science and Systems Engineering,1998,8(1):46-50. 被引量：1
5郑作环.PERIODIC SOLUTIONS OF THE JOSEPHSON EQUATION[J].Systems Science and Mathematical Sciences,1990,3(2):143-150.
6曾宪武,井竹君.Monotonicity and critical points of period[J].Progress in Natural Science:Materials International,1996,6(4):19-25.
7DING Yanheng LI Shujie (Institute of Mathematics,Academia Sinica,Beijing 100080,China).A REMARK ON PERIODIC SOLUTIONS OF SINGULAR HAMILTONIAN SYSTEMS WITH SUBLINEAR TERMS[J].Systems Science and Mathematical Sciences,1992,5(2):121-126. 被引量：1
8王体翔.A STATIC BIFURCATION THEOREM FOR CRITICAL POINTS OF VARIATIONAL PROBLEMS[J].Science China Mathematics,1990,33(11):1303-1310.
9LI Chong & LIU ChunGen School of Mathematical Sciences and LPMC,Nankai University,Tianjin 300071,China.Brake subharmonic solutions of first order Hamiltonian systems[J].Science China Mathematics,2010,53(10):2719-2732. 被引量：4
10QIAN Dingbian & SUN Xiying School of Mathematical Sciences, Suzhou University, Suzhou 215006, China,Laboratory of Mathematics for Nonlinear Sciences, Fudan University, Shanghai 200433, China.Invariant tori for asymptotically linear impact oscillators[J].Science China Mathematics,2006,49(5):669-687. 被引量：5

Science China Mathematics

1990年第12期

浏览历史

内容加载中请稍等...

MASLOV-TYPE INDEX, DEGENERATE CRITICAL POINTS, AND ASYMPTOTICALLY LINEAR HAMILTONIAN SYSTEMS 被引量：17

同被引文献11

引证文献17

二级引证文献19

相关作者

相关机构

相关主题

浏览历史