A relationship between stabilized finite element methods and the Galerkin method with bubble functions

## Abstract We investigate the relationship between finite volume and finite element approximations for the lower‐order elements, both conforming and nonconforming for the Stokes equations. These elements include conforming, linear velocity‐constant pressure on triangles, conforming bilinear veloci

In this note, we make a few comments concerning the paper of Hughes and Akin (Int. J. Numer. Meth. Engng., 15, 733-751 (1980)). Our primary goal is to demonstrate that the rate of convergence of numerical solutions of the ÿnite element method with singular basis functions depends upon the location o

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