In order to study the influence of nonlinear factors on the elastodynamics of spur gear’s pure torsional model, a pure torsional dynamic model of four-degree-of-freedom spur gear is established by using the principle of D’Alembert and the method of micro-displacement. Firstly, a time-varying equation set is solved by Runge-Kutta and time-dispersion methods with the consideration of the nonlinear factors such as gear meshing error, time-varying meshing stiffness and meshing gap, and the dynamic response and the corresponding spectrum of the system are obtained. Next, combined with the nonlinear analysis theory, the global bifurcation diagram and the maximum Lyapunov exponent are obtained by changing the meshing stiffness, the excitation frequency and the tooth side clearance of the system. Then, the periodic motion, quasi-periodic motion and chaos of the system are analyzed from the quantitative and qualitative point of view respectively by using the time history plot, phase space trajectory, Poincáre map and power spectrum. Finally, the coupling influence of nonlinear factors on the system are considered, which provides a complete method for the nonlinear characteristic analysis of gear transmission system.
ZHENG Yuxin,XI Ying,YUAN Lang,BU Wanghui
. Elastodynamics Analysis of Pure Torsional Model of Spur Gear[J]. Journal of Shanghai Jiaotong University, 2019
, 53(3)
: 285
-296
.
DOI: 10.16183/j.cnki.jsjtu.2019.03.005
[1]LIU J K, CHEN F X, CHEN Y M. Bifurcation ana-lysis of aeroelastic systems with hysteresis by incremental harmonic balance method [J]. Applied Mathematics and Computation, 2012, 219(5): 2398-2411.
[2]姚红良, 王重阳, 王帆, 等. 多频激励局部非线性系统响应求解的降维增量谐波平衡法[J]. 振动工程学报, 2015, 28(5): 741-747.
YAO Hongliang, WANG Chongyang, WANG Fan, et al. The dimension-reductive incremental harmonic balance method for solving the response of local nonlinear dynamic system with multi-frequency excitation [J]. Journal of Vibration Engineering, 2015, 28(5): 741-747.
[3]刘振皓.车辆复合行星传动系统动力学特性研究[D].湖北: 武汉大学, 2012.
LIU Zhenhao. Research on dynamic characteristics of vehicle compound planetary gear train sets [D]. Hubei: Wuhan University, 2012.
[4]刘江楠, 苏典, 龚佑发.基于MATLAB的齿轮传动系统振动与分岔理论分析[J]. 机械传动, 2016, 40(2): 19-22.
LIU Jiangnan, SU Dian, GONG Youfa. Analysis of the bifurcation and theory vibration of the gear transmission system based on the MATLAB [J]. Journal of Mechanical Transmission, 2016, 40(2): 19-22.
[5]ERITENEL T, PARKER R G. An investigation of tooth mesh nonlinearity and partial contact loss in gear pairs using a lumped-parameter model [J]. Mechanism and Machine Theory, 2012, 56: 28-51.
[6]ZHANG W, DING Q. Torsion vibration and parametric instability analysis of a spur gear system with time-varying and square nonlinearities [J]. International Journal of Applied Mechanics, 2014, 6(1): 1450007.
[7]DEL RINCON A F, VIADERO F, IGLESIAS M A, et al. A model for the study of meshing stiffness in spur gear transmissions[J]. Mechanism and Machine Theory, 2013, 61: 30-58.
[8]方禹鑫, 丁千, 张微.多齿侧间隙传动系统非线性特性研究[J].振动与冲击, 2016, 35(23): 29-34.
FANG Yuxin, DING Qian, ZHANG Wei. Non-linear dynamic features of a steering gear system with backlashes [J]. Journal of Vibration and Shock, 2016, 35(23): 29-34.
[9]COOLEY C G, PARKER R G. A review of planetary and epicyclic gear dynamics and vibrations research[J]. Applied Mechanics Reviews, 2014, 66(4): 040804.
[10]韩清凯, 于海, 孙伟.机械振动系统的现代动态设计与分析[M].北京: 科学出版社, 2010.
HAN Qingkai, YU Hai, SUN Wei. Modern dynamic design and analysis of mechanical vibration system [M].Beijing: Science Press, 2010.
