| Description |
1 online resource (xi, 389 pages) |
| Series |
Mathematics in science and engineering ; no. 146 |
|
Mathematics in science and engineering ; v. 146.
|
| Contents |
Front Cover; Applications of Functional Analysis and Operator Theory; Copyright Page; Contents; Preface; Acknowledgements; Chapter 1. Banach Spaces; 1.1 Introduction; 1.2 Vector Spaces; 1.3 Normed Vector Spaces; 1.4 Banach Spaces; 1.5 Hilbert Space; Problems; Chapter 2. Lebesgue Integration and the Lp Spaces; 2.1 Introduction; 2.2 The Measure of a Set; 2.3 Measurable Functions; 2.4 Integration; 2.5 The Lp Spases; 2.6 Applications; Problems; Chapter 3. Foundations of Linear Operator Theory; 3.1 Introduction; 3.2 The Basic Terminology of Operator Theory |
|
3.3 Some Algebraic Properties of Linear Operators3.4 Continuity and Boundedness; 3.5 Some Fundamental Properties of Bounded Operators; 3.6 First Results on the Solution of the Equation Lf = g; 3.7 Introduction to Spectral Theory; 3.8 Closed Operators and Differential Equations; Problems; Chapter 4. Introduction to Nonlinear Operators; 4.1 Introduction; 4.2 Preliminaries; 4.3 The Contraction Mapping Principle; 4.4 The Fréchet Derivative; 4.5 Newton's Method for Nonlinear Operators; Problems; Chapter 5. Compact Sets in Banach Spaces; 5.1 Introduction; 5.2 Definitions |
|
5.3 Some Consequences of Compactness5.4 Some Important Compact Sets of Functions; Problems; Chapter 6. The Adjoint Operator; 6.1 Introduction; 6.2 The Dual of a Banach Space; 6.3 Weak Convergence; 6.4 Hilbert Space; 6.5 The Adjoint of a Bounded Linear Operator; 6.6 Bounded Self-adjoint Operators-Spectral Theory; 6.7 The Adjoint of an Unbounded Linear Operator in Hilbert Space; Problems; Chapter 7. Linear Compact Operators; 7.1 Introduction; 7.2 Examples of Compact Operators; 7.3 The Fredholm Alternative; 7.4 The Spectrum; 7.5 Compact Self-adjoint Operators |
|
7.6 The Numerical Solution of Linear Integral EquationsProblems; Chapter 8. Nonlinear Compact Operators and Monotonicity; 8.1 Introduction; 8.2 The Schauder Fixed Point Theorem; 8.3 Positive and Monotone Operators in Partially Ordered Banach Spaces; Problems; Chapter 9. The Spectral Theorem; 9.1 Introduction; 9.2 Preliminaries; 9.3 Background to the Spectral Theorem; 9.4 The Spectral Theorem for Bounded Self-adjoint Operators; 9.5 The Spectrum and the Resolvent; 9.6 Unbounded Self-adjoint Operators; 9.7 The Solution of an Evolution Equation; Problems |
|
Chapter 10. Generalized Eigenfunction Expansions Associated with Ordinary Differential Equations10.1 Introduction; 10.2 Extensions of Symmetric Operators; 10.3 Formal Ordinary Differential Operators: Preliminaries; 10.4 Symmetric Operators Associated with Formal Ordinary Differential Operators; 10.5 The Construction of Self-adjoint Extensions; 10.6 Generalized Eigenfunction Expansions; Problems; Chapter 11. Linear Elliptic Partial Differential Equations; 11.1 Introduction; 11.2 Notation; 11.3 Weak Derivatives and Sobolev Spaces; 11.4 The Generalized Dirichlet Problem |
| Summary |
Applications of functional analysis and operator theory |
| Bibliography |
Includes bibliographical references (pages 371-375) and index |
| Notes |
Print version record |
| Subject |
Functional analysis.
|
|
Operator theory.
|
|
MATHEMATICS -- Functional Analysis.
|
|
Functional analysis
|
|
Operator theory
|
|
Functionaalanalyse.
|
|
Operatoren.
|
|
Toepassingen.
|
| Form |
Electronic book
|
| Author |
Pym, J. S. (John Sydney), 1938-
|
| ISBN |
9780080956541 |
|
0080956548 |
|
1282288741 |
|
9781282288744 |
|
0123632609 |
|
9780123632609 |
|
