节点文献
Winkler地基上有限长梁非线性自由振动
NON-LINEAR FREE VIBRATION OF FINITE-LENGTH BEAMS ON THE WINKLER FOUNDATION
【摘要】 基于经典Winkler地基模型及Euler-Bernoulli梁理论,考虑梁的几何非线性效应,运用Newton第二定律建立了弹性地基上有限长梁的非线性运动方程。采用Galerkin方法对运动方程进行一阶模态截断,进而利用多尺度法求得了该系统自由振动的一阶近似解。揭示了两端简支梁的非线性自由振动特性,分析了弹性模量、长细比及地基刚度系数等参数对系统固有频率的影响。并通过该系统的位移时程曲线,分析了阻尼对弹性地基上梁运动特性的影响。
【Abstract】 The non-linear free vibration of a finite-length beam on the elastic foundation is investigated.Based on the Winkler foundation model and Euler-Bernoulli beam theory,the nonlinear motion equation of the finite-length beam on an elastic foundation with geometric nonlinearity is deduced based on the Newton’s Second Law.The first-order mode truncation of the vibration function is obtained using the Galerkin method.The approximate solution of the free vibration of the finite-length beam is derived utilizing the multi-scale method to illustrate the behaviour of the non-linear free vibration.The effects of the slenderness ratio of beam,the modulus of elastic system and the stiffness of foundation on the natural frequency of the hinged-hinged beam on the Winkler foundation are analyzed.The influence of damping of the soil-beam system on the motion of the beam is also discussed.
【Key words】 Winkler model; Euler-Bernoulli beam; geometrical non-linearity; multi-scale method; time history records;
- 【文献出处】 工程力学 ,Engineering Mechanics , 编辑部邮箱 ,2012年08期
- 【分类号】TU435
- 【被引频次】3
- 【下载频次】181