Analysis of finite element schemes for convection-type problems

## Abstract This paper compares finite element and finite volume schemes for some Poisson‐type problems. Special attention is devoted to the conditioning properties of the linear systems to be solved. For the benchmark which is considered, we show that the finite element scheme leads to the lowest

This article is a continuation of the work [M. Feistauer et al., Num Methods PDEs 13 (1997), 163-190] devoted to the convergence analysis of an efficient numerical method for the solution of an initial-boundary value problem for a scalar nonlinear conservation law equation with a diffusion term. Non

Finite elements using higher-order basis functions in the spirit of the QUICK method for cpnvectiondominated fluid flow and transport problems are introduced and demonstrated. Instead of introducing new internal degrees of freedom, completeness is achieved by including functions based on nodal value

A ÿnite element methodology for obtaining non-oscillatory and non-di usive solutions to convection problems is proposed. The presented technique can be traced back to the concept of ux-corrected transport, but it di ers from the existing FEM-FCT methods in that the high-order solution is corrected p

A class of non-linear elliptic problems in inÿnite domains is considered, with non-linearities extending to inÿnity. Examples include steady-state heat radiation from an inÿnite plate, and the de ection of an inÿnite membrane on a non-linear elastic foundation. Also, this class of problems may serve