High-accuracy plane stress and plate elements in the quadrature element method

In this paper, a highly accurate and rapidly converging hybrid approach is presented for the Quadrature Element Method (QEM) solution of plate free vibration problems. The hybrid QEM essentially consists of a collocation method in conjunction with a Galerkin finite element technique, to combine the

The dierential quadrature (DQ) element method proposed by Wang and Gu in 1997 has been extended to analyse rectangular plate problems. The methodology is worked out in detail and some numerical examples are given.

## Abstract An hypersingular integral equation of a three‐dimensional elastic solid with an embedded planar crack subjected to a uniform stress field at infinity is derived. The solution of the boundary‐integral equation is succeeded taking into consideration an appropriate Gauss quadrature rule fo

The serendipity (eight nodes) and Lagrange (nine nodes) plate elements following the Reissner±Mindlin irreducible formulation for the bending of plates are among the most popular in the ®nite element method. However, reduced integration on the shearing part of the stiness matrix has to be performed