非光滑分析和控制论(数学研究生教程)(Nonsmooth analysis and control theory)
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品牌: 科拉克
基本信息·出版社:世界图书出版公司
·页码:276 页
·出版日期:2009年
·ISBN:7506292653/9787506292658
·条形码:9787506292658
·包装版本:1版
·装帧:平装
·开本:24
·正文语种:英语
·丛书名:数学研究生教程
·外文书名:Nonsmooth analysis and control theory
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内容简介Nonsmooth analysis refers to differential analysis in the absence of differentiability. It can be regarded as a subfield of that vast subject known as nonlinear analysis. While nonsmooth analysis has classical roots (we claim to have traced its lineage hack to Dini), it is only in the last decades that the subject has grown rapidly. To the point, in fact, that further development has sometimes appeared in danger of being stymied, due to the plethora of definitions and unclearly related theories.
目录
Preface
List of Figures
0 Introduction
1 Analysis Without Lineaxization
2 Flow-Invariant Sets
3 Optimization
4 Control Theory
5 Notation
1 Proximal Calculus in Hilbert Space
1 Closest Points and Proximal Normals
2 Proximal Subgradients
3 The Density Theorem
4 Minimization Principles
5 Quadratic Inf-Convolutions
6 The Distance Function
7 Lipschitz Functions
8 The Sum Rule
9 The Chain Rule
10 Limiting Calculus
11 Problems on Chapter 1
2 Generalized Gradients in Banach Space
1 Definition and Basic Properties
2 Basic Calculus
3 Relation to Derivatives
4 Convex and Regular Functions
5 Tangents and Normals
6 Relationship to Proximal Analysis
7 The Bouligand Tangent Cone and Regular Sets
8 The Gradient Formula in Finite Dimensions
9 Problems on Chapter 2
3 Special Topics
1 Constrained Optimization and Value Functions
2 The Mean Value Inequality
3 Solving Equations
4 Derivate Calculus and Rademacher's Theorem
5 Sets in L2 and Integral b-~nctionals
6 Tangents and Interiors
7 Problems on Chapter 3
4 A Short Course in Control Theory
1 Trajectories of DiffercntiM Inclusions
2 Weak Invariance
3 Lipschitz Dependence and Strong Invariance
4 Equilibria
5 Lyapounov Theory and Stabilization
6 Monotonicity and Attainability
7 The Hamilton Jacobi Equation and Viscosity Solutions
8 Feedback Synthesis from Semisolutions
9 Necessary Conditions for Optimal Control
10 Normality and Controllability
11 Problems on Chapter 4
Notes and Comments
List of Notation
Bibliography
Index
……[看更多目录]
序言Pardon me for writing such a long letter; I had not the time to write a short one.
——Lord Chesterfield
Nonsmooth analysis refers to differential analysis in the absence of differentiability. It can be regarded as a subfield of that vast subject known as nonlinear analysis. While nonsmooth analysis has classical roots (we claim to have traced its lineage hack to Dini), it is only in the last decades that the subject has grown rapidly. To the point, in fact, that further development has sometimes appeared in danger of being stymied, due to the plethora of definitions and unclearly related theories.
One reason for the growth of the subject has been, without a doubt, the recognition that nondifferentiable phenomena are more widespread, and play a more important role, than had been thought. Philosophically at least, this is in keeping with the coming to the fore of several other types of irregular and nonlinear behavior: catastrophes, fractals, and chaos.
In recent years, nonsmooth analysis has come to play a role in functional analysis, optimization, optimal design, mechanics and plasticity, differentim equations (as in the theory of viscosity solutions), control theory, and, increasingly, in analysis generally (critical point theory, inequalities, fixed point theory, variational methods ...). In the long run, we expect its methods and basic constructs to be viewed as a natural part of differential analysis.
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