描述
开 本: 24开纸 张: 胶版纸包 装: 平装是否套装: 否国际标准书号ISBN: 9787510075933
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张恭庆编著的《非线性分析方法》内容介绍: The book is the result of many years of revision of the author’s lecture notes. Some of the more involved sections were originally used in seminars as introductory parts of some new subjects. However, due to their importance,the materials have been reorganized and supplemented, so that they may be more valuable to the readers.
目 录
1 Linearization
1.1 Differential Calculus in Banach Spaces
1.1.1 Frechet Derivatives and Gateaux Derivatives
1.1.2 Nemytscki Operator
1.1.3 High-Order Derivatives
1.2 Implicit Function Theorem and Continuity Method
1.2.1 Inverse Function Theorem
1.2.2 Applications
1.2.3 Continuity Method
1.3 Lyapunov-Schmidt Reduction and Bifurcation
1.3.1 Bifurcation
1.3.2 Lyapunov-Schmidt Reduction
1.3.3 A Perturbation Problem
1.3.4 Gluing
1.3.5 Transversality
1.4 Hard Implicit Function Theorem
1.4.1 The Small Divisor Problem
1.4.2 Nash-Moser Iteration
2 Fixed-Point Theorems
2.1 Order Method
2.2 Convex Function and Its Subdifferentials
2.2.1 Convex Functions
2.2.2 Subdifferentials
2.3 Convexity and Compactness
2.4 Nonexpansive Maps
2.5 Monotone Mappings
2.6 Maximal Monotone Mapping
3 Degree Theory and Applications
3.1 The Notion of Topological Degree
3.2 Fundamental Properties and Calculations of Brouwer Degrees
3.3 Applications of Brouwer Degree
3.3.1 Brouwer Fixed-Point Theorem
3.3.2 The Borsuk-Ulam Theorem and Its Consequences
3.3.3 Degrees for S1 Equivariant Mappings
3.3.4 Intersection
3.4 Leray-Schauder Degrees
3.5 The Global Bifurcation
3.6 Applications
3.6.1 Degree Theory on Closed Convex Sets
3.6.2 Positive Solutions and the Scaling Method
3.6.3 Krein-Rutman Theory for Positive Linear Operators
3.6.4 Multiple Solutions
3.6.5 A Free Boundary Problem
3.6.6 Bridging
3.7 Extensions
3.7.1 Set-Valued Mappings
3.7.2 Strict Set Contraction Mappings and Condensing Mappings
3.7.3 Fredholm Mappings
4 Minimization Methods
4.1 Variational Principles
4.1.1 Constraint Problems
4.1.2 Euler-Lagrange Equation
4.1.3 Dual Variational Principle
4.2 Direct Method
4.2.1 Fundamental Principle
4.2.2 Examples
4.2.3 The Prescribing Gaussian Curvature Problem and the Schwarz Symmetric Rearrangement
4.3 Quasi-Convexity
4.3.1 Weak Continuity and Quasi-Convexity
4.3.2 Morrey Theorem
4.3.3 Nonlinear Elasticity
4.4 Relaxation and Young Measure
4.4.1 Relaxations
4.4.2 Young Measure
4.5 Other Function Spaces
4.5.1 BV Space
4.5.2 Hardy Space and BMO Space
4.5.3 Compensation Compactness
4.5.4 Applications to the Calculus of Variations
4.6 Free Discontinuous Problems
4.6.1 F-convergence
4.6.2 A Phase Transition Problem
4.6.3 Segmentation and Mumford-Shah Problem
4.7 Concentration Compactness
4.7.1 Concentration Function
4.7.2 The Critical Sobolev Exponent and the Best Constants
4.8 Minimax Methods
4.8.1 Ekeland Variational Principle
4.8.2 Minimax Principle
4.8.3 Applications
5 Topological and Variational Methods
5.1 Morse Theory
5.1.1 Introduction
5.1.2 Deformation Theorem
5.1.3 Critical Groups
5.1.4 Global Theory
5.1.5 Applications
5.2 Minimax Principles (Revisited)
5.2.1 A Minimax Principle
5.2.2 Category and Ljusternik-Schnirelmann Multiplicity Theorem
5.2.3 Cap Product
5.2.4 Index Theorem
5.2.5 Applications
5.3 Periodic Orbits for Hamiltonian System and Weinstein Conjecture
5.3.1 Hamiltonian Operator
5.3.2 Periodic Solutions
5.3.3 Weinstein Conjecture
5.4 Prescribing Gaussian Curvature Problem on S2
5.4.1 The Conformal Group and the Best Constant
5.4.2 The Palais-Smale Sequence
5.4.3 Morse Theory for the Prescribing Gaussian Curvature Equation on S2
5.5 Conley Index Theory
5.5.1 Isolated Invariant Set
5.5.2 Index Pair and Conley Index
5.5.3 Morse Decomposition on Compact Invariant Sets and Its Extension
Notes
References
1.1 Differential Calculus in Banach Spaces
1.1.1 Frechet Derivatives and Gateaux Derivatives
1.1.2 Nemytscki Operator
1.1.3 High-Order Derivatives
1.2 Implicit Function Theorem and Continuity Method
1.2.1 Inverse Function Theorem
1.2.2 Applications
1.2.3 Continuity Method
1.3 Lyapunov-Schmidt Reduction and Bifurcation
1.3.1 Bifurcation
1.3.2 Lyapunov-Schmidt Reduction
1.3.3 A Perturbation Problem
1.3.4 Gluing
1.3.5 Transversality
1.4 Hard Implicit Function Theorem
1.4.1 The Small Divisor Problem
1.4.2 Nash-Moser Iteration
2 Fixed-Point Theorems
2.1 Order Method
2.2 Convex Function and Its Subdifferentials
2.2.1 Convex Functions
2.2.2 Subdifferentials
2.3 Convexity and Compactness
2.4 Nonexpansive Maps
2.5 Monotone Mappings
2.6 Maximal Monotone Mapping
3 Degree Theory and Applications
3.1 The Notion of Topological Degree
3.2 Fundamental Properties and Calculations of Brouwer Degrees
3.3 Applications of Brouwer Degree
3.3.1 Brouwer Fixed-Point Theorem
3.3.2 The Borsuk-Ulam Theorem and Its Consequences
3.3.3 Degrees for S1 Equivariant Mappings
3.3.4 Intersection
3.4 Leray-Schauder Degrees
3.5 The Global Bifurcation
3.6 Applications
3.6.1 Degree Theory on Closed Convex Sets
3.6.2 Positive Solutions and the Scaling Method
3.6.3 Krein-Rutman Theory for Positive Linear Operators
3.6.4 Multiple Solutions
3.6.5 A Free Boundary Problem
3.6.6 Bridging
3.7 Extensions
3.7.1 Set-Valued Mappings
3.7.2 Strict Set Contraction Mappings and Condensing Mappings
3.7.3 Fredholm Mappings
4 Minimization Methods
4.1 Variational Principles
4.1.1 Constraint Problems
4.1.2 Euler-Lagrange Equation
4.1.3 Dual Variational Principle
4.2 Direct Method
4.2.1 Fundamental Principle
4.2.2 Examples
4.2.3 The Prescribing Gaussian Curvature Problem and the Schwarz Symmetric Rearrangement
4.3 Quasi-Convexity
4.3.1 Weak Continuity and Quasi-Convexity
4.3.2 Morrey Theorem
4.3.3 Nonlinear Elasticity
4.4 Relaxation and Young Measure
4.4.1 Relaxations
4.4.2 Young Measure
4.5 Other Function Spaces
4.5.1 BV Space
4.5.2 Hardy Space and BMO Space
4.5.3 Compensation Compactness
4.5.4 Applications to the Calculus of Variations
4.6 Free Discontinuous Problems
4.6.1 F-convergence
4.6.2 A Phase Transition Problem
4.6.3 Segmentation and Mumford-Shah Problem
4.7 Concentration Compactness
4.7.1 Concentration Function
4.7.2 The Critical Sobolev Exponent and the Best Constants
4.8 Minimax Methods
4.8.1 Ekeland Variational Principle
4.8.2 Minimax Principle
4.8.3 Applications
5 Topological and Variational Methods
5.1 Morse Theory
5.1.1 Introduction
5.1.2 Deformation Theorem
5.1.3 Critical Groups
5.1.4 Global Theory
5.1.5 Applications
5.2 Minimax Principles (Revisited)
5.2.1 A Minimax Principle
5.2.2 Category and Ljusternik-Schnirelmann Multiplicity Theorem
5.2.3 Cap Product
5.2.4 Index Theorem
5.2.5 Applications
5.3 Periodic Orbits for Hamiltonian System and Weinstein Conjecture
5.3.1 Hamiltonian Operator
5.3.2 Periodic Solutions
5.3.3 Weinstein Conjecture
5.4 Prescribing Gaussian Curvature Problem on S2
5.4.1 The Conformal Group and the Best Constant
5.4.2 The Palais-Smale Sequence
5.4.3 Morse Theory for the Prescribing Gaussian Curvature Equation on S2
5.5 Conley Index Theory
5.5.1 Isolated Invariant Set
5.5.2 Index Pair and Conley Index
5.5.3 Morse Decomposition on Compact Invariant Sets and Its Extension
Notes
References
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