Springer数学经典教材:经典巴拿赫空间1和2 [Classical Banach Spaces 1 and 2]

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发表于2024-12-26

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出版社: 世界图书出版公司
ISBN:9787510005251
版次:1
商品编码:10562555
包装:平装
外文名称:Classical Banach Spaces 1 and 2
开本:24开
出版时间:2010-01-01
用纸:胶版纸
页数:242
正文语种:英文


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内容简介

《经典巴拿赫空间1和2》延续了该系列书的一贯风格,深入但不深沉。材料新颖,许多内容是同类书籍不具备的。对于学习Banach空间结构理论的学者来说,这是一本参考价值极高的书籍;对于学习该科目的读者,《经典巴拿赫空间1和2》也是同等重要。目次:schauder 基;C0空间和lp空间;对称基;O rlicz序列空间。
读者对象:数学专业高年级的学生、老师和相关的科研人员。

内页插图

目录

1. Schauder Bases
a. Existence of Bases and Examples
b. Schauder Bases and Duality
c. Unconditional Bases
d. Examples of Spaces Without an Unconditional Basis
e. The Approximation Property
f. Biorthogonal Systems
g. Schauder Decompositions

2. The Spaces co and lp
a. Projections in co and lp and Characterizations of these Spaces
b. Absolutely Summing Operators and Uniqueness of Unconditional Bases
c. Fredholm Operators, Strictly Singular Operators and Complemented Subspaces of lp lr
d. Subspaces of Co and lp and the Approximation Property, Complementably Universal Spaces
e. Banach Spaces Containing Iv or co
f. Extension and Lifting Properties, Automorphisms of loo, co and lx

3. Symmetric Bases
a. Properties of Symmetric Bases, Examples and Special Block Bases
b. Subspaces of Spaces with a Symmetric Basis

4. Orlicz Sequence Spaces
a. Subspaces of Orlicz Sequence Spaces which have a Symmetric Basis
b. Duality and Complemented Subspaces
c. Examples of Orlicz Sequence Spaces.
d. Modular Sequence Spaces and Subspaces of Ip lr
e. Lorentz Sequence Spaces
References
Subject Index

前言/序言

  The appearance of Banachs book [8] in 1932 signified the beginning of a systematic study of normed linear spaces, which have been the subject of continuous research ever since.
  In the sixties, and especially in the last decade, the research activity in this area
  grew considerably. As a result, Banach space theory gained very much in depth as well as in scope. Most of its well known classical problems were solved, many interesting new directions were developed, and deep connections between Banach space theory and other areas of mathematics were established.
  The purpose of this book is to present the main results and current research directions in the geometry of Banach spaces, with an emphasis on the study of the structure of the classical Banach spaces, that is C(K) and Lp() and related spaces.We did not attempt to write a comprehensive survey of Banach space theory, or even only of the theory of classical Banach spaces, since the amount of interesting results on the subject makes such a survey practically impossible.
  A part of the subject matter of this book appeared in outline in our lecture notes[96]. In contrast to those notes, most of the results presented here are given with complete proofs. We therefore hope that it will be possible to use the present book both as a text book on Banach space theory and as a reference book for research workers in the area. It contains much material which was not discussed in [96], a large part of which being the result of very recent research work. An indication to the rapid recent progress in Banach space theory is the fact that most of the many problems stated in [96] have been solved by now.
  In the present volume we also state some open problems. It is reasonable to expect that many of these will be solved in the not too far future. We feel, however,that most of the topics discussed here have reached a relatively final form, and that their presentation will not be radically affected by the solution of the open problems. Among the topics discussed in detail in this volume, the one which seems to us to be the least well understood and which might change the most in the future, is that of the approximation property.

Springer数学经典教材:经典巴拿赫空间1和2 [Classical Banach Spaces 1 and 2] 下载 mobi epub pdf txt 电子书 格式

Springer数学经典教材:经典巴拿赫空间1和2 [Classical Banach Spaces 1 and 2] mobi 下载 pdf 下载 pub 下载 txt 电子书 下载 2024

Springer数学经典教材:经典巴拿赫空间1和2 [Classical Banach Spaces 1 and 2] 下载 mobi pdf epub txt 电子书 格式 2024

Springer数学经典教材:经典巴拿赫空间1和2 [Classical Banach Spaces 1 and 2] 下载 mobi epub pdf 电子书
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   目次:全书其有四部分,新增加了5章,总共17章。(一)集合论、实数和微积分:集合论;实数体系和微积分。(二)测度、积分和微分:实线上的勒贝格理论;实线上的勒贝格积分;测度和乘积测度的扩展;概率论基础;微分和绝对连续;单测度和复测度。(三)拓扑、度量和正规空间:拓扑、度量和正规空间基本理论;可分离性和紧性;完全空间和紧空间;希尔伯特空间和经典巴拿赫空间;正规空间和局部凸空间。(四)调和分析、动力系统和hausdorff侧都:调和分析基础;可测动力系统;hausdorff测度和分形。

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必须读读看,经典巴拿赫

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   读者对象:数学及相关专业的大学高年级学生和研究生。

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这本书覆盖了从入门机械制图工程师/技师所必需知道的关于产业的知识。书中还覆盖了所必需的进阶知识。 《实分析教程(第2版)(英文影印版)》是一部备受专家好评的教科书,书中用现代的方式清晰论述了实分析的概念与理论,定理证明简明易懂,可读性强。在第一版的基础上做了全面修订,有200道例题,练习题由原来的1200道增加到1300习题。本书的写法像一部文学读物,这在数学教科书很少见,因此阅读本书会是一种享受。

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好好好好好好

评分

   目次:全书其有四部分,新增加了5章,总共17章。(一)集合论、实数和微积分:集合论;实数体系和微积分。(二)测度、积分和微分:实线上的勒贝格理论;实线上的勒贝格积分;测度和乘积测度的扩展;概率论基础;微分和绝对连续;单测度和复测度。(三)拓扑、度量和正规空间:拓扑、度量和正规空间基本理论;可分离性和紧性;完全空间和紧空间;希尔伯特空间和经典巴拿赫空间;正规空间和局部凸空间。(四)调和分析、动力系统和hausdorff侧都:调和分析基础;可测动力系统;hausdorff测度和分形。

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内容很丰富,值得一看

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内容很丰富,值得一看

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内容还挺清晰,就是有点密

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