刚度
梁(结构)
直接刚度法
弹簧(装置)
刚度矩阵
抗弯刚度
振动
学位(音乐)
自由度(物理和化学)
Timoshenko梁理论
欧拉公式
数学
结构工程
控制理论(社会学)
数学分析
物理
计算机科学
工程类
人工智能
声学
控制(管理)
量子力学
出处
期刊:Journal of Vibration and Acoustics
日期:2003-07-01
卷期号:125 (3): 351-358
被引量:21
摘要
This paper is concerned with the dynamic stiffness formulation and its application for a Bernoulli-Euler beam carrying a two degree-of-freedom spring-mass system. The effect of a two degree-of-freedom system kinematically connected to the beam is represented exactly by replacing it with equivalent stiffness coefficients, which are added to the appropriate stiffness coefficients of the bare beam. Numerical examples whose results are obtained by applying the Wittrick-Williams algorithm to the total dynamic stiffness matrix are given and compared with published results. Applications of the theory include the free vibration analysis of frameworks carrying two degree-of-freedom spring-mass systems.
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