Functional Analysis
(Sprache: Englisch)
Functional Analysis is primarily concerned with the structure of infinite dimensional vector spaces and the transformations, which are frequently called operators, between such spaces. The elements of these vector spaces are usually functions with certain...
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Klappentext zu „Functional Analysis “
Functional Analysis is primarily concerned with the structure of infinite dimensional vector spaces and the transformations, which are frequently called operators, between such spaces. The elements of these vector spaces are usually functions with certain properties, which map one set into another. Functional analysis became one of the success stories of mathematics in the 20th century, in the search for generality and unification.
Inhaltsverzeichnis zu „Functional Analysis “
- PrefaceI: Preliminaries
1.1. Scope of the Chapter
1.2. Sets
1.3. Set Operations
1.4. Cartesian Product. Relations
1.5. Functions
1.6. Inverse Functions
1.7. Partial Ordering
1.8. Equivalence Reaction
1.9. Operations on Sets
1.10. Cardinality of Sets
1.11. Abstract Mathematical Systems
1.12. Various Abstract Systems. Exercises
II: Linear Vector Spaces
2.1. Scope of the Chapter
2.2. Linear Vector Spaces
2.3. Subspaces
2.4. Linear Independence and Dependence
2.5. Basis and Dimension
2.6. Tensor Product of Linear Spaces
2.7. Linear Transformations
2.8. Matrix Representations of Linear Transformations
2.9. Equivalent and Similar Linear Transformations
2.10. Linear Functionals. Algebraic Dual
2.11. Linear Equations
2.12. Eigenvalues and Eigenvectors. Exercises
III: Introduction to Real Analysis
3.1. Scope of the Chapter
3.2. Properties of Sets of Real Numbers
3.3. Compactness
3.4. Sequences
3.5. Limit and Continuity in Functions
3.6. Differentiation and Integration
3.7. Measure of a Set. Lesbegue Integral. Exercises
IV: Topological Spaces
4.1. Scope of the Chapter
4.2. Topological Structure
4.3. Bases and Subbases
4.4. Some Topological Concepts
4.5. Numerical Functions
4.6. Topological Vector Spaces. Exercises
V: Metric Spaces
5.1. Scope of the Chapter
5.2. The Metric and the Metric Topology
5.3. Various Metric Spaces
5.4. Topological Properties of Metric Spaces
5.5. Compactness of Metric Spaces
5.6. Contraction Mappings
5.7. Compact Metric Spaces
5.8. Approximation
5.9. The Space of Fractals. Exercises
VI: Normed Spaces
6.1. Scope of the Chapter
6.2. Normed Spaces
6.3. Semi-Norms
6.4. Series of Vectors
6.5. Bounded Linear Operators
6.6. Equivalent Normed Spaces
6.7. Bounded Below Operators
6.8. Continuous Linear Functionals
6.9. Topological Dual
6.10. Strong and Weak
... mehr
Topologies
6.11. Compact Operators
6.12. Closed Operators
6.13. Conjugate Operators
6.14. Classification of Continuous Linear Operators. Exercises
VII: Inner Product Spaces
7.1. Scope of the Chapter
7.2. Inner Product Spaces
7.3. Orthogonal Subspaces
7.4. Orthonormal Sets and Fourier Series
7.5. Duals of Hilbert Spaces
7.6. Linear Operators in Hilbert Spaces
7.7. Forms and Variational Equations. Exercises
VIII: Spectral Theory of Linear Operators
8.1. Scope of the Chapter
8.2. The Resolvent Set and the Spectrum
8.3. The Resolvent Operator
8.4. The Spectrum of a Bounded Operator
8.5. The Spectrum of a Compact Operator
8.6. Functions of Operators
8.7. Spectral Theory in Hilbert Spaces. Exercises
IX: Differentiation of Operators
9.1. Scope of the Chapter
9.2. Gâteaux and Fréchet Derivatives
9.3. Higher Order Fréchet Derivatives
9.4. Integration of Operators
9.5. The Method of Newton
9.6. The Method of Steepest Descent
9.7. The Implicit Function Theorem
- Exercises
- References
- Index of Symbols
- Name Index
6.11. Compact Operators
6.12. Closed Operators
6.13. Conjugate Operators
6.14. Classification of Continuous Linear Operators. Exercises
VII: Inner Product Spaces
7.1. Scope of the Chapter
7.2. Inner Product Spaces
7.3. Orthogonal Subspaces
7.4. Orthonormal Sets and Fourier Series
7.5. Duals of Hilbert Spaces
7.6. Linear Operators in Hilbert Spaces
7.7. Forms and Variational Equations. Exercises
VIII: Spectral Theory of Linear Operators
8.1. Scope of the Chapter
8.2. The Resolvent Set and the Spectrum
8.3. The Resolvent Operator
8.4. The Spectrum of a Bounded Operator
8.5. The Spectrum of a Compact Operator
8.6. Functions of Operators
8.7. Spectral Theory in Hilbert Spaces. Exercises
IX: Differentiation of Operators
9.1. Scope of the Chapter
9.2. Gâteaux and Fréchet Derivatives
9.3. Higher Order Fréchet Derivatives
9.4. Integration of Operators
9.5. The Method of Newton
9.6. The Method of Steepest Descent
9.7. The Implicit Function Theorem
- Exercises
- References
- Index of Symbols
- Name Index
... weniger
Bibliographische Angaben
- Autor: E. Suhubi
- 2003, 2003, 691 Seiten, Maße: 16 x 24,1 cm, Gebunden, Englisch
- Verlag: Springer Netherlands
- ISBN-10: 1402016166
- ISBN-13: 9781402016165
- Erscheinungsdatum: 31.10.2003
Sprache:
Englisch
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