Error estimation of Wachspress interpolation on polygonal elements;

Applying a geometrical method to construct the shape functions of the polygonal element,a barycentric finite element method(BFEM) for solving elastic problems was presented.

The irrational function forms interpolation on a polygonal element with arbitrary nodal distribution was constructed by using mean value coordinates of polygonal elements.

A novel polygonal finite element method(PFEM),which is based on partition of unity,was proposed and named as virtual node method(VNM).

Three elements with rotational DOFs are presented, a 4-node quadrilateral element with two translational and a rotational DOFs per node,two 8-node hexahedron elements with three translational and three rotational DOFs per node.

A new quadrilateral element with rotational degree of freedom at each corner is conformed from twelve node isoparametric element in this paper.

The initial mesh may be made of entirely triangular elements or may consist of a mixture of triangular and quadrilateral elements.

In order to solve this problem,we interpret binary system in the SHP file format particular and making the polygon element as example.