This book discusses the accuracy of various finite element approximations and how to improve them with the help of extrapolations and superconvergence’s post-processing technique. The discussion is based on asymptotic expansions for finite element and finally reduce to the technique of integration by parts, embedding theorems and norm equivalence lemmas. Also, the book is devoted to explain the origin of theorems to make what is written correspond with what is originally in our mind.
【目录】
Preface
First Part
1 Euler's Algorithm and Finite Element Method
1.1 Differential Equations of First Order:Fundamental Formula and uler'sAlgorithm
1.2 Differential Equations of Second Order:Finite Element Method and Exact Solution
1.3 A Look Ahead
2 Function Spaces and Norm Equivalence Lemmas
2.1 Function Spaces,Norms and Triangle Inequality
2.2 Angle and Schwartz's Inequality
2.3 Inner Product
2.4 Orthogonality and Projection
2.5 Different Inner Products and Norms
2.6 Multi-index Notation
2.7 Norm Equivalence Lemma
2.8 Expansion Lemma in Order of Derivatives
2.9 For Example
2.10 Gemeralization to Bilinear Functionals
2.11 For Exampole
3 From π to Eigenvalue Computation of PDEs
3.1 Reference:π's Algorithm
3.2 Eigenvalue Problem:One Dimensional Example
3.3 Eigenvalue Problem:Two Dimensional Example
3.4 Preparation:Finite Element Spaces and Finite Element Meth-ods
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