Nonlinear vibrations of thick plates using mindlin plate elements

An iterative Kantorovich method is presented for the vibration analysis of rectangular isotropic thick plates. Mindlin plate characteristic functions are derived in general forms by the Kantorovich method initially starting with Timoshenko beam functions consistent with the boundaryconditionsofthepl

Investigation has been made into various approaches for analyzing the vibration of plates with stepped thicknesses. First, attention has been paid to updating a classical approach for the analysis of such problems, correcting the boundary conditions cited in an earlier paper and dealing with the dif

Axisymmetric free vibrations of moderately thick circular plates described by the linear shear-deformation Mindlin theory are analyzed by the differential quadrature (DQ) method. The first fifteen natural frequencies of vibration are calculated for uniform circular plates with free, simply-supported

This paper presents an application of the spline element method based on the Mindlin plate theory to analyze the vibration of thick skew plates with varying thickness in the longitudinal direction. To demonstrate the convergence and accuracy of the present method, several examples are solved, and re

A free vibration analysis of moderately thick rectangular plates with mixed boundary conditions is presented on the basis of the "rst-order shear deformation plate theory. The di!erential quadrature element method, a highly e$cient and accurate hybrid approach, has been employed. To establish the nu