Laplace变换——有限元法计算结构动响应

Daynamic Respones of Construction Caculated by the Method of Finite Elemts Conbining Laplace Transform

利用Laplace变换 ,采用与静弹性相比拟的方法 ,导出了频域中有限元法公式。并利用一组满足频域中弹性运动方程的通解作为单元的位移函数 ,获得了频域中矩形单元的刚度矩阵。作为实例对梁的动响应进行了计算。

The Laplace transform is utilized to construct the formulation of the finite element by approaching the elastostatic problem.By utilizing the general solution of the governing equations of motion in the Laplace transformed domain as the fuction of displacement,the rectangular element stittness matrix in the Laplace transformed domain is obtained.As a numerical example,the dynamic response of a beam is caculated.