Fourth-order exponential finite difference methods for boundary value problems of convective diffusion type

## Abstract Convergence of a finite element procedure for the solution of the fourth‐order equations is proved. A generalization of this result is mentioned and some remarks concerning the numerical results obtained at the Computing Centre of the Technical University in Brno are given.

## Abstract It is well known that standard finite‐difference schemes for singular boundary value problems involving the Laplacian have difficulty capturing the singular (𝒪(1/__r__) or 𝒪(log __r__)) behavior of the solution near the origin (__r__ = 0). New nonstandard finite‐difference schemes that

A least-squares mixed ®nite element method for the second-order non-self-adjoint two-point boundary value problems is formulated and analysed. Superconvergence estimates are developed in the maximum norm at Gaussian points and at Lobatto points.