| Citation: | Xu Jian, Lu Qishao, Huang Kelei. Nonlinear Normal Modes and Their Superposition in a Two Degrees of Freedom Asymmetric System with Cubic Nonlinearities[J]. Applied Mathematics and Mechanics, 1998, 19(12): 1077-1086.
|
| [1] |
R.M.Rosenberg,Normal modes in nonlinear dual-mode systems,J.Appl.Mech.,27(3)(1960),263-268.
|
| [2] |
R.M.Rosenberg,On normal vibrations of a general class of nonlinear dual-mode systems,J.Appl.M ech.,28(3)(1961),275-283.
|
| [3] |
R.M.Rosenberg,The normal modes of nonlinear n-degree of freedom systems,J.Appl.Mech.,30(1)(1962),7-14.
|
| [4] |
R.M.Rosenberg,On a geometrical method in nonlinear vibrations,in Les Vibrations Forces dans systems Non linearies,Int.Conf.in Nonlinear Vibrations,Marseille(1964).
|
| [5] |
R.M.Rossenberg,On nonlinear vibrations of systems with many degrees of freedom,Adv.Appl.Mech.,8(2)(1966),155-242.
|
| [6] |
S.W.Shaw and C.Pierre,Normal modes for nonlinear vibrations systems,J.Sound Vibration,164(1)(1993),35-122
|
| [7] |
G.V.Anand,Natural modes of a coupled nonlinear system,Internat.J.Non-Linear Mech.,7(1)(1972),81-91.
|
| [8] |
A.K.Mishra and M.C.Singh,The normal modes of nonlinear symmetric systems by group representation theory,Internat.J.Non-Linear.Mech.,9(4)(1974),463-480.
|
| [9] |
T.K.Caughey,A.Vakakis and J.M.Sivo,Analytical study of similar normal modes and their bifurcations in a class of strongly nonlinear systems,Internat.J.Non-Linear Mech.,25(5)(1990),521 533.
|
| [10] |
T.L.Jonson and R.Rand,On the existence and bifurcation of minimal modes,Internat.J.Non-Linear Mech.,14(1)(1979),1-12.
|
| [11] |
陈予恕、徐鉴,Vandel Pol-Duffing-Mathieu型方程主参数共振分叉解的普适性分类,中国科学A辑,25(12)(1995),1281-1297.
|
Supported by: Beijing Renhe Information Technology Co. Ltd
DownLoad: