全部商品分类

您现在的位置: 全部商品分类 > 数理化学科 > 数理化学科 > 数学

测度论(第2版影印版)(英文版)

  • 定价: ¥99
  • ISBN:9787519224134
  • 开 本:24开 平装
  •  
  • 折扣:
  • 出版社:世图出版公司
  • 页数:457页
  • 作者:(美)D.L.科恩
  • 立即节省:
  • 2017-07-01 第1版
  • 2019-04-01 第2次印刷
我要买:
点击放图片

导语

  

内容提要

  

    本书是一部为初学者提供学习测度论的入门书籍,综合性强,清晰易懂。本版与第1版相比,篇幅扩展100页,并新增概率一章。本书全面介绍了测度和积分,重在强调学习分析和测度必需的和相关的一些话题。前几章讲述了抽象测度和积分;后一章讲述微分知识,包括Rd上变量的处理。每章末附有代表性的习题,从常规题型到扩展训练都有涉及,较高难度的习题附有提示。

目录

Introduction
1  Measures
  1.1  Algebras and Sigma-Algebras
  1.2  Measures
  1.3  Outer Measures
  1.4  Lebesgue Measure
  1.5  Completeness and Regularity
  1.6  Dynkin Classes
2  Functions and Integrals
  2.1  Measurable Functions
  2.2  Properties That Hold Almost Everywhere
  2.3  The Integral
  2.4  Limit Theorems
  2.5  The Riemann Integral
  2.6  Measurable Functions Again, Complex-Valued
  Functions, and Image Measures
3  Convergence
  3.1  Modes of Convergence
  3.2  Normed Spaces
  3.3  Definition of LP and LP
  3.4  Properties of LP and LP
  3.5  Dual Spaces
4  Signed and Complex Measures
  4.1  Signed and Complex Measures
  4.2  Absolute Continuity
  4.3  Singularity
  4.4  Functions of Finite Variation
  4.5  The Duals of the LP Spaces
5  Product Measures
  5.1  Constructions
  5.2  Fubini's Theorem
  5.3  Applications
6  Differentiation
  6.1  Change of Variable in Rd
  6.2  Differentiation of Measures
  6.3  Differentiation of Functions
7  Measures on Locally Compact Spaces
  7.1  Locally Compact Spaces
  7.2  The Riesz Representation Theorem
  7.3  Signed and Complex Measures; Duality
  7.4  Additional Properties of Regular Measures
  7.5  The μ*-Measurable Sets and the Dual ofL1
  7.6  Products of Locally Compact Spaces
  7.7  The Daniell-Stone Integral
8  Polish Spaces and Analytic Sets
  8.1  Polish Spaces
  8.2  Analytic Sets
  8.3  The Separation Theorem and Its Consequences
  8.4  The Measurability of Analytic Sets
  8.5  Cross Sections
  8.6  Standard, Analytic, Lusin, and Souslin Spaces
9  Haar Measure
  9.1  Topological Groups
  9.2  The Existence and Uniqueness of Haar Measure
  9.3  Properties of Haar Measure
  9.4  The Algebras L1 (G) and M(G)
10  Probability
  10.1  Basics
  10.2  Laws of Large Numbers
  10.3  Convergence in Distribution and the Central Limit Theorem
  10.4  Conditional Distributions and Martingales
  10.5  Brownian Motion
  10.6 Construction of Probability Measures
A  Notation and Set Theory
B  Algebra and Basic Facts About R and C
C  Calculus and Topology in Rd
D  Topological Spaces and Metric Spaces
E  The Bochner Integral
F  Liftings
G  The Banach-Tarski Paradox
H  The Henstock-Kurzweii and McShane Integrals
References
Index of notation
Index