分析·第1卷

《分析(第1卷)(英文)》內容簡介：This reprint has been authorized by Springer Science & Busincss Media for distribution in China Mainland only and not for export therefrom.

Preface

Chapter Ⅰ Foundations

1 Fundamentals of Logic

2 Sets

Elementary Facts

The Power Set

Complement, Intersection and Union

Products

Families of Sets

3 Functions

Simple Examples

Composition of Functions

Commutative Diagrams

Injections, Surjections and Bijections

Inverse Functions

Set Valued Functions

4 Relations and Operations

Equivalence R;elations

Order Relations

Operations

5 The Natural Numbers

The Peano Axioms

The Arithmetic of Natural Numbers

The Division Algorithm

The Induction Principle

Recursive Definitions

6 Countab:ility

Permutations

Equinumerous Sets

Countable Sets

Infinite Products

7 Groups and Homomorphisms

Groups

Subgroups

Cosets

Homomorphisms

Isomorphisms

8 Rings, Fields and Polynomials

Rings

The Binomial Theorem

The Multinomial Theorem

Fields

Ordered Fields

Formal Power Series

Polynomials

Polynomial Functions

Division of Polynomials

Linear Factors

Polynomials in Several Indeterminates

9 The Rational Numbers

The Integers

The Rational Numbers

Rational Zeros of Polynomials

Square Roots

10 The Real Numbers

Order Completeness

Dedekind's Construction of the Real Numbers

The Natural Order on R

The Extended Number Line

A Characterization of Supremum and Infimum

The Archimedean Property

The Density of the Rational Numbers in R

nth Roots

The Density of the Irrational Numbers in R

Intervals

11 The Complex Numbers

Constructing the Complex Numbers

Elementary Properties

Computation with Complex Numbers

Balls in K

12 Vector Spaces, Affine Spaces and Algebras

Vector Spaces

Linear Functions

Vector Space Bases

Affine Spaces

Affine Functions

Polynomiallnterpolation

Algebras

Difference Operators and Summation Formulas

Newton Interpolation Polynomials

Chapter Ⅱ Convergence

1 Convergence of Sequences

Sequences

Metric Spaces

Cluster Points

Convergence

Bounded Sets

Uniqueness of the Limit

Subsequences

2 Real and Complex Sequences

Null Sequences

Elementary Rules

The Comparison Test

Complex Sequences

3 Normed Vector Spaces

Norms

Balls

Bounded Sets

Examples

The Space of Bounded Functions

Inner Product Spaces

The Cauchy-Schwarz Inequality

Euclidean Spaces

Equivalent Norms

Convergence in Product Spaces

4 Monotone Sequences

Bounded Monotone Sequences

Some Important Limits

5 Infinite Limits

Convergence to ±∞

The Limit Superior and Limit Inferior

The Bolzano-Weierstrass Theorem

6 Completeness

Cauchy Sequences

Banach Spaces

Cantor's Construction of the Real Numbers

7 Series

Convergence of Series

Harmonic and Geometric Series

Calculating with Series

Convergence Tests

Alternating Series

Decimal, Binary and Other Representations of Real Numbers

The Uncountability of R

8 Absolute Convergence

Majorant, Root and Ratio Tests

The Exponential Function

Rearrangements of Series

Double Series

Cauchy Products

9 Power Series

The Radius of Convergence

Addition and Multiplication of Power Series

The Uniqueness of Power Series Representations

Chapter Ⅲ Continuous Functions

1 Contimuty

Elementary Properties and Examples

Sequential Continuity

Addition and Multiplication of Continuous Functions

One-Sided Continuity

2 The Fndamentals of Topology

OpenSets

ClosedSets

The Closure of a Set

The Interior of a Set

The Boundary ofa Set

The Hausdorff Condition

Examples

A Characterization of Continuous Functions

Continuous Extensions

Relative Topology

General Topological Spaces

3 Compactness

Covers

A Characterization of Compact Sets

Sequential Compactness

Continuous Functions on Compact Spaces

The Extreme Value Theorem

Total Boundedness

Uniform Continuity

Compactness in General Topological Spaces

4 Connectivity

Definition and Basic Properties

Connectivity in R

The Generalized Intermediate Value Theorem

Path Connectivity

Connectivity in General Topological Spaces

5 Functions on R

Bolzano's Intermediate Value Theorem

Monotone Functions

Continuous Monotone Functions

6 The Exponential and Related Functions

Euler's Formula

The Real Exponential Function

The Logarithm and Power Functions

The Exponential Function on iR

The Definition of 7r and its Consequences

The Tangent and Cotangent Functions

The Complex Exponential Function

Polar Coordinates

Complex Logarithms

Complex Powers

A Further Representation of the Exponential Function

……

Chapter Ⅳ Differentiation in One Variable

Chapter Ⅴ Sequences of Functions

Appendix Introduction to Mathematical Logic

Bibliography

Index