碰振系统中的共存周期轨道

李群宏; 陆启韶

碰振系统中的共存周期轨道

北京航空航天大学理学院北京 100083

基金项目: 国家自然科学基金资助项目(重大19990510,19872010);教育部博士学科点基金资助项目(98000619)

详细信息

作者简介:
李群宏(1964- ),男,广西南宁人,博士(E-mail:lqunhsec@sina.com);陆启韶(1940- ),男,广东顺德人,教授,博导(E-mail:qishaolu@hotmail.com).

中图分类号: O175;O322
计量
- 文章访问数: 2303
- HTML全文浏览量: 114
- PDF下载量: 625
- 被引次数: 0
出版历程
- 收稿日期: 2001-05-28
- 修回日期: 2002-12-10
- 刊出日期: 2003-03-15

Coexisting Periodic Orbits in Vibro-Impacting Dynamical Systems

Shool of Science, Beijing University of Aeronautics and Astronautics, Beijing 100083, P. R. China

摘要

摘要: 提出一种寻找分段线性碰振系统中的多个周期轨道共存的分析方法,这些单碰周期轨道包含稳定的和不稳定的轨道。给出了单碰周期轨道存在性或不存在性的解析判别式,特别是对如何保证在单碰周期运动中不会发生其它的碰撞的问题作了比较深入的研究,得到若干定理。最后讨论了所得共存周期轨道的稳定性问题,获得了稳定性的判别式。还以数值模拟结果验证了理论分析的结论。
- 振碰系统 /
- 周期轨道 /
- 存在性 /
- 稳定性
Abstract: Abstract: A method is presented to seek for coexisting periodic orbits which may be stable or unstable in piecewise-linear vibro-impacting systems.The conditions for coexistence of single impact periodic orbits are derived, and in particular, it is investigated in details how to assure that no other impacts will happen in an evolution period of a single impact periodic motion.Furthermore, some criteria for nonexistence of single impact periodic orbits with specific periods are also established.Finally, the stability of coexisting periodic orbits is discussed, and the corresponding computation formula is given.Examples of numerical simulation are in good agreement with the theoretic analysis.
- vibro-impact system /
- periodic orbit /
- existence /
- stability

HTML全文

参考文献(14)

[1]	Guckenheimer J,Holmes P.Nonlinear Oscillations,Dynamical Systems,and Bifurcations of Vector Fields[M].New York:Springer-Verlag,1986.
[2]	Wigins S.Introduction to Applied Nonlinear Dynamical Systems and Chaos[M].(Reprinted).New York:Springer-Verlag,1991.
[3]	Wiggins S.Global Bifurcations and Chaos,Analytical Methods[M].New York:Springer-Verlag,1988.
[4]	Bazejczyk-Okolewska B,Kapitaniak T.Co-existing attractors of impact oscillator[J].Chaos,Solitons & Fractals,1998,9(8):1439-1443.
[5]	Feudel U,Grebogi C,Poon L,Yorke J A.Dynamical properties of a simple mechanical system with a large number of coexisting periodic attractors[J].Chaos,Solitons & Fractals,1998,9(1/2):171-180.
[6]	Whiston G S.Global dynamics of a vibro-impacting linear oscillator[J].J Sound Vib,1987,118(3):395-424.
[7]	Shaw S W,Holmes P J.A periodically forced piecewise linear oscillator[J].J Sound Vib,1983,90(1):129-155.
[8]	Ivanov A P.Stabilization of an impact oscillator near grazing incidence owing to resonance[J].J Sound Vib,1993,162(3):562-565.
[9]	Whiston G S.Impacting under harmonic excitation[J].J Sound Vib,1979,67(2):179-186.
[10]	Whiston G S.The vibro-impact response of a harmonically excited and preloaded one-dimensional linear oscillator[J].J Sound Vib,1987,115(2):303-319.
[11]	Nordmark A B.Non-periodic motion caused by grazing incidence in an impact oscillator[J].J Sound Vib,1991,145(2):279-297.
[12]	Foale S,Bishop S R.Dynamical complexities of forced impacting systems[J].Phil Trans Royal Soc London A,1992,338(4):547-556.
[13]	Nordmark A B.Effects due to low velocity in mechanical oscillators[J].Int J Bifurcation and Chaos,1992,2(3):597-605.
[14]	Shaw S W,Rand R H.The transition to chaos in a simple mechanical system[J].Int J Nonlinear Mech,1989,24(1):41-56.

施引文献

资源附件(0)

访问统计

计量

文章访问数: 2303
HTML全文浏览量: 114
PDF下载量: 625
被引次数: 0

姓名
邮箱
手机号码
标题
留言内容
验证码

留言板

碰振系统中的共存周期轨道

作者简介:
李群宏(1964- ),男,广西南宁人,博士(E-mail:lqunhsec@sina.com);陆启韶(1940- ),男,广东顺德人,教授,博导(E-mail:qishaolu@hotmail.com).

计量

Coexisting Periodic Orbits in Vibro-Impacting Dynamical Systems

计量

目录

留言板

碰振系统中的共存周期轨道

作者简介: 李群宏(1964- ),男,广西南宁人,博士(E-mail:lqunhsec@sina.com);陆启韶(1940- ),男,广东顺德人,教授,博导(E-mail:qishaolu@hotmail.com).

计量

出版历程

Coexisting Periodic Orbits in Vibro-Impacting Dynamical Systems

计量

出版历程

目录

作者简介:
李群宏(1964- ),男,广西南宁人,博士(E-mail:lqunhsec@sina.com);陆启韶(1940- ),男,广东顺德人,教授,博导(E-mail:qishaolu@hotmail.com).