品牌:桑达拉姆
基本信息
·出版社:人民邮电出版社
·页码:357 页码
·出版日:2008年
·ISBN:7115176078/9787115176073
·条码:9787115176073
·版次:1版(英文版)
·装帧:平装
·开本:16 16
·中文:中文
·丛书名:图灵原版数学·统计学系列
内容简介
最优化是在20世纪得到快速发展的一门学科。本书介绍了最优化理论及其在经济学和相关学科中的应用,全书共分三个部分。第一部分研究了Rn中最优化问题的解的存在性以及如何确定这些解,第二部分探讨了最优化问题的解如何随着基本参数的变化而变化,最后一部分描述了有限维和无限维的动态规划。另外,还给出基础知识准备一章和三个附录,使得本书自成体系。
本书适合于高等院校经济学、工商管理、保险学、精算学等专业高年级本科生和研究生参考。
作者简介
Rangarajan K.Sundaram,毕业于美国康乃尔大学,哲学博士,工商管理硕士。先后在罗切斯特人学和组约人学斯特恩商学院任教,授课课程涉及微分、期权定价、最优化理论、博弈论、公司理财、经济学原理、中级微观经济学和数理经济学等。研究领域包括:代理问题、管理层薪资水平、公司础财、衍生工具定价、信用风险与信用衍生工具等。他在世界顶级学术期刊上还发表了大量论文。
目录
Mathematical Preliminaries
1.1Notation and Preliminary Definitions
1.1.1Integers, Rationals, Reals, Rn
1.1.2Inner Product, Norm, Metric
1.2 Sets and Sequences in Rn
1.2.1 Sequences and Limits
1.2.2Subsequences and Limit Points
1.2.3Cauchy Sequences and Completeness
1.2.4Suprema, Infima, Maxima, Minima
1.2.5 Monotone Sequences in R
1.2.6The Lim Sup and Lim Inf
1.2.7Open Balls, Open Sets, Closed Sets
1.2.8 Bounded Sets and Compact Sets
1.2.9Convex Combinations and Convex Sets
1.2.10 Unions, Intersections, and Other Binary Operations
1.3 Matrices
1.3.1 Sum, Product, Transpose
1.3.2Some Important Classes of Matrices
1.3.3Rank of a Matrix
1.3.4 The Determinant
1.3.5 The Inverse
1.3.6Calculating the Determinant
1.4 Functions
1.4.1 Continuous Functions
1.4.2Differentiable and Continuously Differentiable Functions
1.4.3 Partial Derivatives and Differentiability
1.4.4 Directional Derivatives and Differentiability
1.4.5 Higher Order Derivatives
1.5 Quadratic Forms: Definite and Semidefinite Matrices
1.5.1 Quadratic Forms and Definiteness
1.5.2 Identifying Definiteness and Semidefiniteness
1.6 Some Important Results
1.6.1 Separation Theorems
1.6.2 The Intermediate and Mean Value Theorems
1.6.3 The Inverse and Implicit Function Theorems
1.7 Exercises
2 Optimization in R
2.1Optimization Problems in Rn
2.2 Optimization Problems in Parametric Form
2.3 Optimization Problems: Some Examples
2.5 A Roadmap
2.6 Exercises
3 Existence of Solutions: The Weierstrass Theorem
3.1 The Weierstrass Theorem
3.2 The Weierstrass Theorem in Applications
3.3 A Proof of the Weierstrass Theorem
3.4 Exercises
4 Unconstrained Optima
4.1 "Unconstrained" Optima
4.2 First-Order Conditions
4.3 Second-Order Conditions
4.4 Using the First- and Second-Ordei Conditions
4.5 A Proof of the First-Order Conditions
4.6 A Proof of the Second-Order Conditions
4.7 Exercises
5 Equality Constraints and the Theorem of Lagrange
5.1 Constrained Optimization Problems
5.2 Equality Constraints and the Theorem of Lagrange
5.2.1 Statement of the Theorem
5.2.2 The Constraint Qualification
5.2.3 The Lagrangean Multipliers
5.3 Second-Order Conditions
5.4 Using the Theorem of Lagrange
5.4.1 A "Cookbook" Procedure
5.4.2 Why the Procedure Usually Works
5.4.3 When It Could Fail
5.4.4 A Numerical Example
5.5 Two Examples from Economics
5.5.1 An Illustration from Consumer Theory
5.5.2 An Illustration from Producer Theory
5.5.3 Remarks
5.6 A Proof of the Theorem of Lagrange
5.7 A Proof of the Second-Order Conditions
5.8 Exercises
6 Inequality Constraints and the Theorem of Kuhn and Tucker
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