不动点理论导论
点此进入淘宝搜索页搜索分類: 图书,自然科学,数学,几何与拓扑,
作者: (美)伊斯特拉泰斯库 著
出 版 社:
出版时间: 2009-5-1字数:版次: 1页数: 466印刷时间:开本: 24开印次:纸张:I S B N : 9787510004599包装: 平装目录
Editor's Preface
Foreword
CHAPTER 1. Topological Spaces and Topological Linear Spaces
1.1. Metric Spaces
1.2. Compactness in Metric Spaces. Measures of Noncompactness
1.3. Baire Category Theorem
1.4. Topological Spaces
1.5. Linear Topological Spaces. Locally Convex Spaces
CHAPTER 2. Hilbert spaces and Banach spaces
2.1. Normed Spaces. Banach Spaces
2.2. Hilbert Spaces
2.3. Convergence in X, X* and L(X)
2.4. The Adjoint of an Operator
2.5. Classes of Banach Spaces
2.6. Measures of Noncompactness in Banach Spaces
2.7. Classes of Special Operators on Banach Spaces
CHAPTER 3. The Contraction Principle
3.0. Introduction
3.1. The Principle of Contraction Mapping in Complete Metric Spaces
3.2. Linear Operators and Contraction Mappings
3.3. Some Generalizations of the Contraction Mappings
3.4. Hilbert's Projective Metric and Mappings of ContractiveType
3.5. Approximate Iteration
3.6, A Converse of the Contraction Principle
3.7. Some Applications of the Contraction Principle
CHAPTER 4. Brouwer's Fixed Point Theorem
4.0. Introduction
4.1. The Fixed Point Property
4.2. Brouwer's Fixed Point theorem. Equivalent Formulations
4.3. Robbins' Complements of Brouwer's Theorem
4.4. The Borsuk-Ulam Theorem
4.5. An Elementary Proof of Brouwer's Theorem
4.6. Some Examples
4.7. Some Applications of Brouwer's Fixed Point Theorem
4.8. The Computation of Fixed Points. Scarfs Theorem
CHAPTER 5. Schauder's Fixed Point Theorem and Some Generalizations
5.0. Introduction
5.1. The Schauder Fixed Point Theorem
5.2. Darbo's Generalization of Schauder's Fixed Point Theorem
5.3. Krasnoselskii's, Rothe's and Altman's Theorems
5.4. Browder's and Fan's Generalizations of Schauder's and Tychonoff's Fixed Point Theorem
5.5. Some Applications
CHAPTER 6. Fixed Point Theorems for Nonexpansive Mappings and Related Classes of Mappings
6.0. Introduction
6.1. Nonexpansive Mappings
6.2. The Extension of Nonexpansive Mappings
6.3. Some General Properties of Nonexpansive Mappings
6.4. Nonexpansive Mappings on Some Classes of Banach Spaces
6.5. Convergence of Iterations of Nonexpansive Mappings
6.6. Classes of Mappings Related to Nonexpansive Mappings
6.7. Computation of Fixed Points for Classes of Nonexpansive Mappings
6.8. A Simple Example of a Nonexpansive Mapping on a Rotund Space Without Fixed Points
CHAPTER 7.Sequences of Mappings and Fixed Points
CHAPTER 8.Duality Masppings and Monotone Operators
CHAPTER 9.Families of Mappings and Fixed Points
CHAPTER 10.Fixed Points and Set-Valued Mappings
CHAPTER 11.Fixed Point Theorems for Mappings on PM-Spaces
CHAPTER 12.The Topological Degree
BIBLIOGRAHY
INDEX
