Convergence properties of two nonconforming finite elements

We give a new analysis of a nonconforming Galerkin finite element method for solving linear elliptic singularly perturbed boundary value problems for rectangular domains. In the case of ordinary boundary layers the method is shown to be convergent uniformly with respect to the perturbation parameter

## Generalized patch test The 4-node quadrilateral membrane elements AGQ6-I and II are two novel incompatible models formulated by the Quadrilateral Area Coordinate Method (QACM). In this paper, the sufficient conditions for their convergence are established. It is further shown theoretically that

The article is devoted to the study of convergence properties of a Finite Volume Method (FVM) using Voronoi boxes for discretization. The approach is based on the construction of a new nonconforming Finite Element Method (FEM), such that the system of linear equations coincides completely with that

Penalty methods have been proposed as a viable method for enforcing interelement continuity constraints on nonconforming elements. Particularly for fourth-order problems in which C '-continuity leads to elements of high degree or complex composite elements, the use of penalty methods to enforce the