Galerkin Finite Element Methods for Parabolic Problems

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This book provides insight in the mathematics of Galerkin finite element method as applied to parabolic equations. The approach is based on first discretizing in the spatial variables by Galerkin's method, using piecewise polynomial trial functions, and then applying some single step or multistep time stepping method. The concern is stability and error analysis of approximate solutions in various norms, and under various regularity assumptions on the exact solution. The book gives an excellent insight in the present ideas and methods of analysis. The second edition has been influenced by recent progress in application of semigroup theory to stability and error analysis, particulatly in maximum-norm. Two new chapters have also been added, dealing with problems in polygonal, particularly noncovex, spatial domains, and with time discretization based on using Laplace transformation and quadrature.

Author(s): Vidar Thomée (auth.)
Series: Springer Series in Computational Mathematics 25
Edition: 2nd ed
Publisher: Springer Berlin Heidelberg
Year: 1997

Language: English
Commentary: +OCR
Pages: 382
City: Berlin; New York
Tags: Numerical Analysis; Analysis

Front Matter....Pages I-X
The Standard Galerkin Method....Pages 1-22
Methods Based on More General Approximations of the Elliptic Problem....Pages 23-34
Nonsmooth Data Error Estimates....Pages 35-50
More General Parabolic Equations....Pages 51-62
Maximum-Norm Stability and Error Estimates....Pages 63-80
Negative Norm Estimates and Superconvergence....Pages 81-94
Single Step Fully Discrete Schemes for the Homogeneous Equation....Pages 95-110
Single Step Methods and Rational Approximations of Semigroups....Pages 111-125
Single Step Fully Discrete Schemes for the Inhomogeneous Equation....Pages 127-144
Multistep Backward Difference Methods....Pages 145-162
Incomplete Iterative Solution of the Algebraic Systems at the Time Levels....Pages 163-179
The Discontinuous Galerkin Time Stepping Method....Pages 181-208
A Nonlinear Problem....Pages 209-222
Semilinear Parabolic Equations....Pages 223-238
The Method of Lumped Masses....Pages 239-252
The H 1 and H -1 Methods....Pages 253-266
A Mixed Method....Pages 267-278
A Singular Problem....Pages 279-287
Back Matter....Pages 289-302