Preface to Part H/A
INTRODUCTIoN To THE SUBJECT
CHAPTER 18 VariationaJ Problems,the Ritz Method,and the Idea of Orthogonality
CHAPTER 19 The Galerkin Method for Differential and Integral Equations, the Friedrichs Extension,and the Idea of Self-Adjointness
CHAPTER 20 Difference Methods and Stability LINEAR MONOTONE PROBLEMS
CHAPTER 21 Auxiliary Tools and the Convergence of the Galerkin Method for Linear Operator Equations
CHAPTER 22 Hilbert Space Methods and Linear Elliptic Differential Equations
CHAPTER 23 Hilbert Space Methods and Linear Parabolic Differential Equations
CHAPTER 24 Hilbert Space Methods and Linear Hyperbolic Differential‘Equations
Preface to Part ll/B
GENERALIZATION To NONLINEAR STATIoNARY PRoBLEMS
Basic Ideas of the Theory of Monotone Operators
CHAPTER 25 Lipschitz Continuous,Strongly Monotone Operators,the Projection—Iteration Method,and Monotone Potential Operators
CHAPTER 26 Monotone Operators and Quasi.Linear Elliptic Differential Equations
CHAPTER 27 Pseudomonotone Operators and Quasi.Linear Elliptic Difierential Equations
CHAPTER 28 Monotone Operators and Hammerstein Integral Equations
CHAPTER 29 Noncoercive Equations,Nonlinear Fredholm Alternatives, Locally Monotone Operators,Stability,and Bifurcation
GENERALIZATION TO NONLINEAR NONSTATIONARY PROBLEMS
CHAPTER 30 First-Order Evolution Equations and the Galerkin Method
CHAPTER 31 Maximal Accretive Operators, Nonlinear Nonexpansive Semigroups, and First-Order Evolution Equations
CHAPTER 32 Maximal Monotone Mappings
CHAPTER 33 Second-Order Evolution Equations and the Galerkin Method
GENERAL THEORY OF DISCRETIZATION METHODS
CHAPTER 34 Inner Approximation Schemes, A-Proper Operators, and the Galerkin Method
CHAPTER 35 External Approximation Schemes, A-Proper Operators, and the Difference Method
CHAPTER 36 Mapping Degree for A-Proper Operators
Appendix
References
List of Symbols
List of Theorems
List of the Most Important Definitions
List of Schematic Overviews
List of Important Principles
Index
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