Superconvergence of convection-diffusion equations in two dimensions
Date
1999-12
Authors
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.
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Unrestricted.
Keywords
Fluid dynamics, Partial, Differential equations, Reaction-diffusion equations, Finite element method