摘要
对于弹性地基上自由边矩形薄板的弯曲、稳定和振动问题,本文选择了一个挠曲函数,它能精确满足自由边全部边界条件以及自由角点的条件.应用能量变分原理,给出了确定挠曲函数中待定参数的方程,以及稳定性方程和频率方程,给出了求最小临界力和最小固有频率的一般公式.
For the bending, stability and vibrations of rectangular thin plates with free edges on elastic foundations, in this paper we give a flexural function which exactly satisfies not only all the boundary conditions on free edges but also the conditions at free corner points. Applying energy variation principle, we give equations defining parameters in flexural function, stability equation, frequency equation, and general formulae of minimum critical force and minimum eigenfrequency as well.
出处
《应用数学和力学》
EI
CSCD
北大核心
1991年第4期391-396,共6页
Applied Mathematics and Mechanics
关键词
弹性地基
薄板
弯曲
振动
稳定性
bending, flexual function, stability, vibration, critical force, frequency
