Dynamic Analysis Model of Rubber Bearing Based on Geometric Nonlinearity

被引:0
|
作者
Lin, Zhi Dan [1 ]
Li, Xin [1 ]
机构
[1] Dalian Univ Tech, City Inst, Dalian 116600, Liaoning, Peoples R China
来源
2018 2ND INTERNATIONAL WORKSHOP ON RENEWABLE ENERGY AND DEVELOPMENT (IWRED 2018) | 2018年 / 153卷
关键词
STABILITY;
D O I
10.1088/1755-1315/153/3/032030
中图分类号
X [环境科学、安全科学];
学科分类号
08 ; 0830 ;
摘要
According to the rubber bearing, the mathematical model of rubber bearing based on geometric nonlinear is established by using Hamilton's principle. Based on the assumption of homogeneous column, the dynamics model is investigated considering the cross section rotated and the influence of the shear deformation and axial pressure. Finally, the geometric nonlinearity governing equation and boundary conditions of the rubber bearing is deduced.
引用
收藏
页数:7
相关论文
共 50 条
  • [1] Geometric nonlinear dynamic model of rubber bearing based on the stress-strain analysis of micro-unit
    Lin, Z. D.
    Shi, H.
    3RD INTERNATIONAL CONFERENCE ON ENERGY EQUIPMENT SCIENCE AND ENGINEERING (ICEESE 2017), 2018, 128
  • [2] Simplified analysis of mode III dynamic rupture with geometric nonlinearity
    Fan, JS
    APPLIED MATHEMATICAL MODELLING, 2001, 25 (09) : 793 - 801
  • [3] FLEXIBLE MULTIBODY SYSTEMS MODELING FOR A DYNAMIC ANALYSIS WITH GEOMETRIC NONLINEARITY
    Gutierrez, Ruth
    Lugris, Urbano
    Cuadrado, Javier
    Romera, Luis E.
    REVISTA INTERNACIONAL DE METODOS NUMERICOS PARA CALCULO Y DISENO EN INGENIERIA, 2007, 23 (02): : 159 - 176
  • [4] Dynamic analysis of beam structures considering geometric and constitutive nonlinearity
    Mata, P.
    Oller, S.
    Barbat, A. H.
    COMPUTER METHODS IN APPLIED MECHANICS AND ENGINEERING, 2008, 197 (6-8) : 857 - 878
  • [5] Constitutive relation study for vibration isolation rubber of geometric nonlinearity and material nonlinearity based on experimental data support
    Zhu, C.L. (zhucongling@126.com), 1600, Trans Tech Publications, P.O. Box 1254, Clausthal-Zellerfeld, D-38670, Germany (426):
  • [6] Dynamic characteristics analysis of rubber components based on an overlay model
    Li S.
    Luo S.
    Wang B.
    Ma W.
    Zhendong yu Chongji/Journal of Vibration and Shock, 2020, 39 (08): : 264 - 270
  • [7] Nonlinear Dynamic Analysis of Rotor-Bearing System with Cubic Nonlinearity
    Nan, Guofang
    Zhu, Yujie
    Zhang, Yang
    Guo, Wei
    SHOCK AND VIBRATION, 2021, 2021
  • [8] ON THE ROLE OF NONLINEARITY IN THE DYNAMIC BEHAVIOR OF RUBBER COMPONENTS
    HARRIS, J
    STEVENSON, A
    RUBBER CHEMISTRY AND TECHNOLOGY, 1986, 59 (05): : 740 - 764
  • [9] DYNAMIC-RESPONSE OF A BEAM WITH A GEOMETRIC NONLINEARITY
    MASRI, SF
    MARIAMY, YA
    ANDERSON, JC
    JOURNAL OF APPLIED MECHANICS-TRANSACTIONS OF THE ASME, 1981, 48 (02): : 404 - 410
  • [10] DYNAMIC STABILITY OF ROTATING BLADES WITH GEOMETRIC NONLINEARITY
    CHEN, LW
    PENG, WK
    JOURNAL OF SOUND AND VIBRATION, 1995, 187 (03) : 421 - 433
12345