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Stochastic responses of Duffing–Van der Pol vibro-impact system under additive colored noise excitation |
| Li Chao (李超)a, Xu Wei (徐伟)a, Wang Liang (王亮)a, Li Dong-Xi (李东喜)b |
a Department of Applied Mathematics, Northwestern Polytechnical University, Xi’an 710072, China;
b School of Mathematics, Taiyuan University of Technology, Taiyuan 030024, China |
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Abstract A response analysis procedure is developed for a vibro-impact system excited by colored noise. The non-smooth transformation is used to convert the vibro-impact system into a new system without impact term. With the help of the modified quasi-conservative averaging, the total energy of the new system can be approximated as a Markov process, and the stationary probability density function (PDF) of the total energy is derived. The response PDFs of the original system are obtained using the analytical solution of the stationary PDF of the total energy. The validity of the theoretical results is tested through comparison with the corresponding simulation results. Moreover, stochastic bifurcations are also explored.
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Received: 07 March 2013
Revised: 27 April 2013
Accepted manuscript online:
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PACS:
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02.50.-r
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(Probability theory, stochastic processes, and statistics)
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05.40.-a
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(Fluctuation phenomena, random processes, noise, and Brownian motion)
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05.40.Ca
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(Noise)
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| Fund: Project supported by the National Natural Science Foundation of China (Grant Nos. 11172233, 10932009, and 11202160) and the Natural Science Foundation of Shaanxi Province, China (Grant No. 2012JQ1004). |
Corresponding Authors:
Li Chao
E-mail: xgdlc2011@163.com
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Cite this article:
Li Chao (李超), Xu Wei (徐伟), Wang Liang (王亮), Li Dong-Xi (李东喜) Stochastic responses of Duffing–Van der Pol vibro-impact system under additive colored noise excitation 2013 Chin. Phys. B 22 110205
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| [1] |
Stratonovitch R L 1963 Topics in the Theory of Random Noise (Vol. 1) (New York: Gordon and Breach)
|
| [2] |
Khasminskii R Z 1966 Theory of Probability & Its Applications 11 390
|
| [3] |
Zhu W Q 1992 Random Vibration (Beijing: Science Press) (in Chinese)
|
| [4] |
Lin Y K and Cai G Q 1995 Probabilistic Structural Dynamics (New York: McGraw-Hill)
|
| [5] |
Roberts J B and Spanos P D 1986 Int. J. Non-Linear Mech. 21 111
|
| [6] |
Zhu W Q and Cai G Q 2002 Acta Mech. Sin. 18 551
|
| [7] |
Roberts J B 1983 IUTAM Symposium on Random Vibrations and Reliability October 31–November 6, 1982 Frankfurt, Germany, p. 285
|
| [8] |
Dimentberg M, Cai G Q and Lin Y K 1995 Int. J. Non-Linear Mech. 30 677
|
| [9] |
Zeng Y and Zhu W Q 2010 Int. J. Non-Linear Mech. 45 572
|
| [10] |
Xu Y, Gu R C, Zhang H Q, Xu W and Duan J Q 2011 Phys. Rev. E 83 056215
|
| [11] |
Brogliatoa B 1999 Nonsmooth Mechanics: Models, Dynamics and Control (London: Springer)
|
| [12] |
Bernardo M di, Budd C J, Champneys A R and Kowalczyk P 2007 Piecewise-smooth Dynamical Systems: Theory and Applications (London: Springer)
|
| [13] |
Chin W, Ott E, Nusse H E and Grebogi C 1994 Phys. Rev. E 50 4427
|
| [14] |
Weger J D, Binks D and Molenaar J 1996 Phys. Rev. Lett. 76 3951
|
| [15] |
Luo G W, Chu Y D, Zhang Y L and Zhang J G 2006 J. Sound Vib. 298 154
|
| [16] |
Budd C and Dux F 1994 Phil. Trans. R. Soc. Lond. A 347 365
|
| [17] |
Wagg D J and Bishop S R 2001 Int. J. Bifurcation Chaos 11 57
|
| [18] |
Wagg D J 2004 Chaos Soliton. Fract. 22 541
|
| [19] |
Feng J Q, Xu W and Niu Y J 2010 Acta Phys. Sin. 59 157 (in Chinese)
|
| [20] |
Huang Z L, Liu Z H and Zhu W Q 2004 J. Sound Vib. 275 223
|
| [21] |
Feng J Q, Xu W and Wang R 2008 J. Sound Vib. 309 730
|
| [22] |
Feng J Q, Xu W, Rong H W and Wang R 2009 Int. J. Non-Linear Mech. 44 51
|
| [23] |
Rong H W, Wang X D, Xu W and Fang T 2009 J. Sound Vib. 327 173
|
| [24] |
Su M B and Rong H W 2011 Chin. Phys. B 20 060501
|
| [25] |
Roberts J B 1978 J. Sound Vib. 60 177
|
| [26] |
Cai G Q 1995 J. Eng. Mech. 121 633
|
| [27] |
Xie W X, Xu W and Cai L 2006 Acta Phys. Sin. 55 1639 (in Chinese)
|
| [28] |
Gan Z N, Ma J, Zhang G Y and Chen Y 2008 Chin. Phys. B 17 4047
|
| [29] |
Wang B, Wu X Q and Shao J H 2009 Acta Phys. Sin. 58 1391 (in Chinese)
|
| [30] |
Yang J H and Liu X B 2010 Chin. Phys. B 19 050504
|
| [31] |
Zhang X Y, Xu W and Zhou B C 2011 Acta Phys. Sin. 60 060514 (in Chinese)
|
| [32] |
Xiao R, Wang C J and Zhang L 2012 Chin. Phys. B 21 110504
|
| [33] |
Zhuravlev V F 1976 Mech. Solids 11 23
|
| [34] |
Dimentberg M F and Iourtchenko D V 2004 Nonlinear Dyn. 36 229
|
| [35] |
Gardiner C W 2004 Handbook of Stochastic Methods (New York: Springer)
|
| [36] |
Zhu W Q 2003 Nonlinear Stochastic Dynamics and Control: Framework of Hamiltonian Theory (Beijing: Science Press) (in Chinese)
|
| [37] |
Krenk S and Roberts J B 1999 J. Appl. Mech. 66 225
|
| [38] |
Zhang H Q, Xu W and Xu Y 2009 Physica A 388 781
|
| [39] |
Ludwig Arnold 1998 Random Dynamical Systems (New York: Springer)
|
| [40] |
Xu W, He Q, Rong H W and Fang T 2003 Proceedings of the Fifth International Conference on stochastic Structural Dynamics-SSD03 May 26–28, 2003 Hangzhou, China, p. 509
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