Walter Rudin《数学分析原理》

作者简介

 

　　沃尔特·鲁丁（Walter Rudin）1953年于杜克大学获得数学博士学位. 曾先后执教于麻省理工学院、罗切斯特大学、威斯康星大学麦迪逊分校、耶鲁大学等. 他的主要研究兴趣集中在调和分析和复变函数. 除本书外，他还著有《Functional Analysis》和《Real and Complex Analysis》等其他名著，这些教材已被翻译成十几种语言，在世界各地广泛使用。

内容简介

　　《数学分析原理（英文版·原书第3版·典藏版）》是一部近代的数学名著，一直受到数学界的推崇。该书作为分析学经典著作，在西方各国乃至我国有着广泛西深远的影响，被许多高校用作数学分析课程的必选教材。

　　《数学分析原理（英文版·原书第3版·典藏版）》涵盖了高等微积分学的丰富内容，精彩部分集中在基础拓扑结构、函数序列与函数项级数、多元函数以及微分形式的积分等章节。第3版经过增删与修订，更加符合学生的阅读习惯和思考方式。

　　《数学分析原理（英文版·原书第3版·典藏版）》内容精练，结构简明，具有Rudin著作的典型特色，堪称字典意义上的教科书。

    

目录

Preface

Chapter 1　The Real and Complex Number Systems

　Introduction

　Ordered Sets

　Fields

　The Real Field

　The Extended Real Number System

　The Complex Field

　Euclidean Spaces

　Appendix

　Exercises

Chapter 2　Basic Topology

　Finite， Countable， and Uncountable Sets

　Metric Spaces

　Compact Sets

　Perfect Sets

　Connected Sets

　Exercises

Chapter 3　Numerical Sequences and Series

　Convergent Sequences

　Subsequences

　Cauchy Sequences

　Upper and Lower Limits

　Some Special Sequences

　Series

　Series of Nonnegative Terms

　The Number e

　The Root and Ratio Tests

　Power Series

　Summation by Parts

　Absolute Convergence

　Addition and Multiplication of Series

　Rearrangements

　Exercises

Chapter 4　Continuity

　Limits of Functions

　Continuous Functions

　Continuity and Compactness

　Continuity and Connectedness

　Discontinuities

　Monotonic Functions

　Infinite Limits and Limits at Infinity

　Exercises

Chapter 5　Differentiation

　The Derivative of a Real Function

　Mean Value Theorems

　The Continuity of Derivatives

　L'Hospital's Rule

　Derivatives of Higher Order

　Taylor's Theorem

　Differentiation of Vector-valued Functions

　Exercises

Chapter 6　The Riemann-Stieltjes Integral

　Definition and Existence of the Integral

　Properties of the Integral

　Integration and Differentiation

　Integration of Vector-valued Functions

　Rectifiable Curves

　Exercises

Chapter 7　Sequences and Series of Functions，

　Discussion of Main Problem

　Uniform Convergence

　Uniform Convergence and Continuity

　Uniform Convergence and Integration

　Uniform Convergence and Differentiation

　Equicontinuous Families of Functions

　The Stone-Weierstrass Therem

　Exercises

Chapter 8　Some Special Functions

　Power Series

　The Exponential and Logarithmic Functions

　The Trigonometric Functions

　The Algebraic Completeness of the Complex Field

　Fourier Series

　The Gamma Function

　Exercises

Chapter 9　Functions of Several Variables

　Linear Transformations

　Differentiation

　The Contraction Principle

　The Inverse Function Theorem

　The Implicit Function Theorem

　The Rank Theorem

　Determinants

　Derivatives of Higher Order

　Differentiation of Integrals

　Exercises

Chapter 10　Integration of Differential Forms

　Integration

　Primitive Mappings

　Partitions of Unity

　Change of Variables

　Differential Forms

　Simplexes and Chains

　Stokes' Theorem

　Closed Forms and Exact Forms

　Vector Analysis

　Exercises

Chapter 11　The Lebesgue Theory

　Set Functions

　Construction of the Lebesgue Measure

　Measure Spaces

　Measurable Functions

　Simple Functions

　Integration

　Comparison with the Riemann Integral

　Integration of Complex Functions

　Functions of Class [WTHT]L[WT]\+

　Exercises

Bibliography

List of Special Symbols

Index