A rapidly converging technique for vibration analysis of plates with a discrete mass distribution

A discrete least squares technique for computing the free transverse vibrations of membranes and plates is presented. The proposed technique consists of two steps. In the first step a quadratic matrix eigenvalue problem resulting from the minimization of a discrete residual error function is solved.

The problem studied is that of determining the lowest frequency of vibration of a rectangular plate, simply supported on two edges and free on the other two, and carrying a rigid mass of finite width running completely across the plate. Appropriate minimum principles are developed and approximate fr

A simplified technique for the dynamic analysis of geometrically nonlinear plate structures is developed. The essence of this technique is the construction of a linear substitute of the nonlinear problem. The linear substitute problem is derived from an equivalence criterion which involves balancing