Decomposition of almost Poisson structure of non-self-adjoint dynamical systems 被引量：5

Decomposition of almost Poisson structure of non-self-adjoint dynamical systems

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摘要 Non-self-adjoint dynamical systems, e.g., nonholonomic systems, can admit an almost Poisson structure, which is formulated by a kind of Poisson bracket satisfying the usual properties except for the Jacobi identity. A general theory of the almost Poisson structure is investigated based on a decompo- sition of the bracket into a sum of a Poisson one and an almost Poisson one. The corresponding rela- tion between Poisson structure and symplectic structure is proved, making use of Jacobiizer and symplecticizer. Based on analysis of pseudo-symplectic structure of constraint submanifold of Chaplygin’s nonholonomic systems, an almost Poisson bracket for the systems is constructed and decomposed into a sum of a canonical Poisson one and an almost Poisson one. Similarly, an almost Poisson structure, which can be decomposed into a sum of canonical one and an almost "Lie-Poisson" one, is also constructed on an affine space with torsion whose autoparallels are utilized to describe the free motion of some non-self-adjoint systems. The decomposition of the almost Poisson bracket di- rectly leads to a decomposition of a dynamical vector field into a sum of usual Hamiltionian vector field and an almost Hamiltonian one, which is useful to simplifying the integration of vector fields. Non-self-adjoint dynamical systems, e.g., nonholonomic systems, can admit an almost Poisson structure, which is formulated by a kind of Poisson bracket satisfying the usual properties except for the Jacobi identity. A general theory of the almost Poisson structure is investigated based on a decomposition of the bracket into a sum of a Poisson one and an almost Poisson one. The corresponding relation between Poisson structure and symplectic structure is proved, making use of Jacobiizer and symplecticizer. Based on analysis of pseudo-symplectic structure of constraint submanifold of Chaplygin’s nonholonomic systems, an almost Poisson bracket for the systems is constructed and decomposed into a sum of a canonical Poisson one and an almost Poisson one. Similarly, an almost Poisson structure, which can be decomposed into a sum of canonical one and an almost “Lie-Poisson” one, is also constructed on an affine space with torsion whose autoparallels are utilized to describe the free motion of some non-self-adjoint systems. The decomposition of the almost Poisson bracket directly leads to a decomposition of a dynamical vector field into a sum of usual Hamiltionian vector field and an almost Hamiltonian one, which is useful to simplifying the integration of vector fields.

作者 GUO YongXin LIU Chang LIU ShiXing CHANG Peng

机构地区 College of Physics Department of Applied Mechanics

出处《Science China(Technological Sciences)》 SCIE EI CAS 2009年第3期761-770,共10页 中国科学（技术科学英文版）

基金 Supported by the National Natural Science Foundation of China (Grant Nos. 10872084, 10472040) the Outstanding Young Talents Training Fund of Liaoning Province of China (Grant No. 3040005) the Research Program of Higher Educa-tion of Liaoning Province of China (Grant No. 2008S098)

关键词 almost-Poisson structure non-self-adjointness NONHOLONOMIC systems SYMPLECTIC form JACOBI identity torsion almost-Poisson structure non-self-adjointness nonholonomic systems symplectic form Jacobi identity torsion

分类号 TB122 [理学—工程力学]

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参考文献2

1郭永新,梅凤翔.INTEGRABILITY FOR PFAFFIAN CONSTRAINED SYSTEMS: A GEOMETRICAL THEORY[J].Acta Mechanica Sinica,1998,14(1):85-91. 被引量：2
2郭永新,罗绍凯,梅凤翔.非完整约束系统几何动力学研究进展:Lagrange理论及其它[J].力学进展,2004,34(4):477-492. 被引量：26

二级参考文献7

1刘端.NOETHER’S THEOREM AND ITS INVERSE OF NONHOLONOMIC NONCONSERVATIVE DYNAMICAL SYSTEMS[J].Science China Mathematics,1991,34(4):419-429. 被引量：17
2郭仲衡.一类非完整力学问题的合理解[J].中国科学（A辑）,1994,24(5):485-497. 被引量：9
3陈滨,朱海平.状态空间线性约束大范围性质分析与运动规划[J].中国科学（A辑）,1997,27(6):533-541. 被引量：3
4罗绍凯,郭永新,梅凤翔.约束力学系统的联络及其运动方程的测地性质[J].应用数学和力学,1998,19(9):779-783. 被引量：3
5朱如曾.非完整力学的第二类、第一类和中间类型变分原理[J].中国科学（A辑）,1999,29(1):49-54. 被引量：13
6梁立孚.非完整系统动力学中的Vakonomic模型和Четаев模型[J].力学进展,2000,30(3):358-369. 被引量：12
7陈滨.关于经典非完整力学的一个争议[J].力学学报,1991,23(3):379-384. 被引量：32

共引文献26

1王勇,郭永新.Riemann-Cartan空间中的d’Alembert-Lagrange原理[J].物理学报,2005,54(12):5517-5520. 被引量：12
2郭永新,赵喆,刘世兴,王勇,朱娜,韩晓静.非完整系统Chetaev动力学和vakonomic动力学的等价条件[J].物理学报,2006,55(8):3838-3844. 被引量：11
3郭永新,赵喆,刘世兴,刘畅.论微分约束系统的d-δ对易关系[J].物理学报,2008,57(3):1301-1306. 被引量：2
4刘世兴,郭永新,刘畅.一类特殊非完整力学系统的辛算法计算[J].物理学报,2008,57(3):1311-1315. 被引量：7
5赵喆,郭永新,刘畅,刘世兴.三类非完整变分下的约束运动微分方程[J].物理学报,2008,57(4):1998-2005. 被引量：1
6梅凤翔.经典约束力学系统对称性与守恒量研究进展[J].力学进展,2009,39(1):37-43. 被引量：25
7王勇,叶淑群.Riemann-Cartan空间中的自平行线[J].东莞理工学院学报,2009,16(3):50-53.
8王勇,郭永新,吕群松,刘畅.非完整映射理论与刚体定点转动的几何描述[J].物理学报,2009,58(8):5142-5149. 被引量：8
9梅凤翔,吴惠彬.经典力学的历史贡献与启示[J].科技导报,2012,30(11):61-68. 被引量：2
10白文君,于莹.非线性约束动力学系统的Lagrange逆问题[J].辽宁大学学报（自然科学版）,2000,27(2):118-122.

同被引文献66

1GUO YongXin1,LIU Chang2,WANG Yong3,LIU ShiXing1 & CHANG Peng2 1 College of Physics,Liaoning University,Shenyang 110036,China,2 School of Aerospace Engineering,Beijing Institute of Technology,Beijing 110081,China,3 School of Basic Medical Science,Guangdong Medical College,Dongguan 523808,China.Nonholonomic mapping theory of autoparallel motions in Riemann-Cartan space[J].Science China(Physics,Mechanics & Astronomy),2010,53(9):1707-1715. 被引量：6
2郭永新,罗绍凯,梅凤翔.非完整约束系统几何动力学研究进展:Lagrange理论及其它[J].力学进展,2004,34(4):477-492. 被引量：26
3王勇,郭永新.Riemann-Cartan空间中的d’Alembert-Lagrange原理[J].物理学报,2005,54(12):5517-5520. 被引量：12
4H. Kleinert,A. Pelster.Letter: Autoparallels From a New Action Principle[J]. General Relativity and Gravitation . 1999 (9)
5Hehl F W,McCrea J D,Mielke E W.Metric-affine gauge theory of gravity:Field equations,Noether identities,world spinors,and breaking of dilation invariance. Physics Reports . 1995
6Trautman A.Einstein-Cartan theory. . 2008
7Bilby B A,Bullough R,Smith E.Continuous distributions of dislocations:A new application of methods of non-Riemannian geometry. Proceedings of the Royal Society Series A Mathematical Physical and Engineering Sciences . 1955
8Sciama D W.On the analogy between charge and spin in general relativity. Recent Developments in General Relativity . 1962
9Cacciatori S L,Caldarelli M M,Giacomini A,et al.Chern-Simons formulation of three-dimensional gravity with torsion and nonmetricity. Journal of Applied Geophysics . 2006
10Camacho A,Maciás A.Space-time torsion contribution to quantum interference phases. Physics Letters B . 2005

引证文献5

1GUO YongXin1,LIU Chang2,WANG Yong3,LIU ShiXing1 & CHANG Peng2 1 College of Physics,Liaoning University,Shenyang 110036,China,2 School of Aerospace Engineering,Beijing Institute of Technology,Beijing 110081,China,3 School of Basic Medical Science,Guangdong Medical College,Dongguan 523808,China.Nonholonomic mapping theory of autoparallel motions in Riemann-Cartan space[J].Science China(Physics,Mechanics & Astronomy),2010,53(9):1707-1715. 被引量：6
2王勇,吕群松,刘畅,刘世兴.刚体定点转动欧拉角的几何性质[J].辽宁大学学报（自然科学版）,2009,36(3):197-200. 被引量：3
3郭永新,刘畅,王勇,刘世兴,常鹏.Riemann-Cartan空间自平行运动的非完整映射理论[J].中国科学：物理学、力学、天文学,2010,40(8):1035-1043.
4LIU Chang,LIU ShiXing,GUO YongXin.Inverse problem for Chaplygin’s nonholonomic systems[J].Science China(Technological Sciences),2011,54(8):2100-2106. 被引量：4
5Yong WANG,Chang LIU,Jing XIAO,Fengxiang MEI.Quasi-momentum theorem in Riemann-Cartan space[J].Applied Mathematics and Mechanics(English Edition),2018,39(5):733-746.

二级引证文献13

1LIU Chang,LIU ShiXing,GUO YongXin.Inverse problem for Chaplygin’s nonholonomic systems[J].Science China(Technological Sciences),2011,54(8):2100-2106. 被引量：4
2周婧,高印寒,陈小林,刘长英,刘静.基于单摄像机视觉测量系统的网络化数据融合[J].吉林大学学报（工学版）,2013,43(1):92-97. 被引量：1
3刘畅,宋端,刘世兴,郭永新.非齐次Hamilton系统的Birkhoff表示[J].中国科学：物理学、力学、天文学,2013,43(4):541-548. 被引量：7
4李婷婷,刘成,姜秀杰,刘波.探空火箭任务可视化设计[J].计算机仿真,2013,30(6):46-50. 被引量：3
5宋端,刘畅,郭永新.构造Birkhoff函数(组)的参数调节法[J].应用数学和力学,2013,34(9):995-1002. 被引量：1
6王勇,陈英华.一类可映射为Riemann空间的Riemann-Cartan位形空间[J].唐山学院学报,2014,27(6):5-7.
7王勇,张延芳,陈英华.欧几里得位形空间几何性质的曲线坐标表示[J].广东石油化工学院学报,2014,24(6):72-74.
8王勇,陈英华.无约束线性映射对位形空间曲率的影响[J].唐山学院学报,2015,28(6):1-2.
9邓晓燕,潘文俊,郑镇城,林灿光,付志平,张广滔.Kinect与Darwin机器人的联合调试与仿真平台的设计与实现[J].计算技术与自动化,2017,36(4):10-13.
10Yong WANG,Chang LIU,Jing XIAO,Fengxiang MEI.Quasi-momentum theorem in Riemann-Cartan space[J].Applied Mathematics and Mechanics(English Edition),2018,39(5):733-746.

1Design from Korean Identity[J].设计,2006,22(12):27-27.
2MAA Dah-You(Institute of Acoustics, Academia Sinica Beijing 100080).General theory and design of microperforated-panel absorbers[J].Chinese Journal of Acoustics,1997,16(3):193-202. 被引量：11
3Zhang Hongwu,Zhong Wanxie,Li Yunpeng, Research Institute of Engineering Mechanics, Dalian University of Technology, Dalian 116023.STRESS SINGULARITY ANALYSIS AT CRACK TIP ON BI-MATERIAL INTERFACES BASED ON HAMILTONIAN PRINCIPLE[J].Acta Mechanica Solida Sinica,1996,9(2):124-138. 被引量：5
4张剑,李思简.TORSION OF COMPOSITE LAMINATED BARS WITH A LARGE NUMBER OF LAYERS[J].Applied Mathematics and Mechanics(English Edition),1998,19(6):585-591.
5林升光.应力S(t)为Poisson更新过程时结构可靠度[J].强度与环境,1995,22(1):54-59. 被引量：1
6数字摄影新助手[J].科技新时代（下半月）,2006(2):105-105.
7郭唏娟,常福清.Jacobi、Gauss-Seidel迭代收敛的准则[J].工程数学学报,1992,9(3):50-56. 被引量：1
8STARZ! identity STARZ!的力量元素[J].中国图象图形学报（B辑）,2003,8(2):48-48.
9DING, HJ,WANG, GQ,HE, WJ.A NECESSARY AND SUFFICIENT FORMULATION FOR TORSION PROBLEMS OF ANISOTROPIC BODIES[J].Acta Mechanica Solida Sinica,1995,8(3):255-262.
10Zou Guiping (Department of Engineering Mechanics,Tongji University,Shanghai 200092).AN EXACT SYMPLECTIC SOLUTION FOR THE DYNAMIC ANALYSIS OF SHEAR DEFORMABLE ANTISYMMETRIC ANGLE-PLY LAMINATED PLATES[J].Acta Mechanica Solida Sinica,1996,9(3):263-273.

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