Superconvergence of convection-diffusion equations in two dimensions

Date

1999-12

Journal Title

Journal ISSN

Volume Title

Publisher

Texas Tech University

Abstract

This thesis studies the convergence of a singularly perturbed two-dimensional problem of the convection-diflfusion type. The problem is solved using the bilinear finite element method on a Shishkin Mesh. This thesis will consider the results of two separate types of Shishkin Meshes, as well as a quick consideration of the uniform mesh and its shortcomings. Results will show a superconvergence rate close to 0 using a discrete energy norm. Results will also consider stability of the method by examining the condition number of the element stiffness matrix.

Description

Rights

Rights Availability

Unrestricted.

Keywords

Fluid dynamics, Partial, Differential equations, Reaction-diffusion equations, Finite element method

Citation