欧氏空间上的勒贝格积分
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作者: (美)琼斯著
出 版 社: 世界图书出版公司
出版时间: 2010-1-1字数:版次: 1页数: 588印刷时间: 2010-1-1开本: 24开印次: 1纸张: 胶版纸I S B N : 9787510005558包装: 平装
本书简明、详细地介绍勒贝格测度和Rn上的积分。本书的基本目的有四个,介绍勒贝格积分;从一开始引入n维空间;彻底介绍傅里叶积分;深入讲述实分析。贯穿全书的大量练习可以增强读者对知识的理解。目次:Rn导论;Rn勒贝格测度;勒贝格积分的不变性;一些有趣的集合;集合代数和可测函数;积分;Rn勒贝格积分;Rn的Fubini定理;Gamma函数;Lp空间;抽象测度的乘积;卷积;Rn+上的傅里叶变换;单变量傅里叶积分;微分;R上函数的微分。
读者对象:本书适用于数学专业的学生、老师和相关的科研人员。
Preface
Bibliography
Acknowledgments
1 Introduction to Rn
A Sets
B Countable Sets
C Topology
D Compact Sets
E Continuity
F The Distance Function
2 Lebesgue Measure on Rn
A Construction
B Properties of Lebesgue Measure
C Appendix: Proof of P1 and P2
3 Invariance of Lebesgue Measure
A Some Linear Algebra
B Translation and Dilation
C Orthogonal Matrices
D The General Matrix
4 Some Interesting Sets
A A Nonmeasurable Set
B A Bevy of Cantor Sets
C The Lebesgue Function
D Appendix: The Modulus of Continuity of the Lebesgue Functions
5 Algebras of Sets and Measurable Functions
A Algebras and a-Algebras
B Borel Sets
C A Measurable Set which Is Not a Borel Set
D Measurable Functions
E Simple Functions
6 Integration
A Nonnegative Functions
B General Measurable Functions
C Almost Everywhere
D Integration Over Subsets of Rn
E Generalization: Measure Spaces
F Some Calculations
G Miscellany
7 Lebesgue Integral on Rn
A Riemann Integral
B Linear Change of Variables
C Approximation of Functions in L1
D Continuity of Translation in L1
8 Fubini's Theorem for Rn
9 The Gamma Function
A Definition and Simple Properties
B Generalization
C The Measure of Balls
D Further Properties of the Gamma Function
E Stirling's Formula
F The Gamma Function on R
10 LP Spaces ,
A Definition and Basic Inequalities
B Metric Spaces and Normed Spaces
C Completeness of Lp
D The Case p=∞
E Relations between Lp Spaces
F Approximation by C∞c (Rn)
G Miscellaneous Problems ;
H The Case 0[p[1
11 Products of Abstract Measures
A Products of 5-Algebras
B Monotone Classes
C Construction of the Product Measure
D The Fubini Theorem
E The Generalized Minkowski Inequality
12 Convolutions
A Formal Properties
B Basic Inequalities
C Approximate Identities
13 Fourier Transform on Rn
A Fourier Transform of Functions in L1 (Rn)
B The Inversion Theorem
C The Schwartz Class
D The Fourier-Plancherel Transform
E Hilbert Space
F Formal Application to Differential Equations
G Bessel Functions
H Special Results for n = i
I Hermite Polynomials
14 Fourier Series in One Variable
A Periodic Functions
B Trigonometric Series
C Fourier Coefficients
D Convergence of Fourier Series
E Summability of Fourier Series
F A Counterexample
G Parseval's Identity
H Poisson Summation Formula
I A Special Class of Sine Series
15 Differentiation
A The Vitali Covering Theorem
B The Hardy-Littlewood Maximal Function
C Lebesgue's Differentiation Theorem
D The Lebesgue Set of a Function
E Points of Density
F Applications
G The Vitali Covering Theorem (Again)
H The Besicovitch Covering Theorem
I The Lebesgue Set of Order p
J Change of Variables
K Noninvertible Mappings
16 Differentiation for Functions on R
A Monotone Functions
B Jump Functions
C Another Theorem of Fubini
D Bounded Variation
E Absolute Continuity
F Further Discussion of Absolute Continuity
G Arc Length
H Nowhere Differentiable Functions
I Convex Functions
Index
Symbol Index
