群論導論

群論導論

《群論導論》是一本(美國)羅曼(Joseph J.Rotman)編制,由世界圖書出版公司在2009年8月1日出版的書籍。

基本介紹

  • 書名:群論導論
  • 頁數:  513頁
  • 裝幀:平裝 
  • 開本:24
圖書信息,作者簡介,內容簡介,目錄,

圖書信息

出版社: 世界圖書出版公司; 第1版 (2009年8月1日)
外文書名: An Introduction to the Theory of Groups
正文語種: 英語
ISBN: 7510004985, 9787510004988
條形碼: 9787510004988
尺寸: 22.2 x 14.8 x 2.2 cm
重量: 640 g

作者簡介

作者:(美國)羅曼(Joseph J.Rotman)

內容簡介

《群論導論(第4版)(英文版)》介紹了:Group Theory is a vast subject and, in this Introduction (as well as in theearlier editions), I have tried to select important and representative theoremsand to organize them in a coherent way. Proofs must be clear, and examplesshould illustrate theorems and also explain the presence of restrictive hypo-theses. ! also believe that some history should be given so that one canunderstand the origin of problems and the context in which the subjectdeveloped. Just as each of the earlier editions differs from the previous one in a signifi-cant way, the present (fourth) edition is genuinely different from the third.Indeed, this is already apparent in the Table of Contents. The book nowbegins with the unique factorization of permutations into disjoint cycles andthe parity of permutations; only then is the idea of group introduced. This isconsistent with the history of Group Theory, for these first results on permu-tations can be found in an 1815 paper by Cauchy, whereas groups of permu-tations were not introduced until 1831 (by Galois)But even if history

目錄

Preface to the Fourth Edition
From Preface to the Third Edition
To the Reader
CHAPTER 1 Groups and Homomorphisms
Permutations
Cycles
Factorization into Disjoint Cycles
Even and Odd Permutations
Semigroups
Groups
Homomorphisms
CHAPTER 2 The Isomorphism Theorems
Subgroups
Lagrange's Theorem
Cycic Groups
Normal Subgroups
Quotient Groups
The Isomorphism Theorems
Correspondence Theorem
Direct Products
CHAPTER 3 Symmetric Groups and G-Sets
Conjugates
Symmetric Groups
The Simplicity of A.
Some Representation Theorems
G-Sets
Counting Orbits
Some Geometry
CHAPTER 4 The Sylow Theorems
p-Groups
The Sylow Theorems
Groups of Small Order
CHAPTER 5 Normal Series
Some Galois Theory
The Jordan-Ho1der Theorem
Solvable Groups
Two Theorems of P. Hall
Central Series and Nilpotent Groups
p-Groups
CHAPTER 6 Finite Direct Products
The Basis Theorem
The Fundamental Theorem of Finite Abelian Groups
Canonical Forms; Existence
Canonical Forms; Uniqueness
The KrulI-Schmidt Theorem
Operator Groups
CHAPTER 7 Extensions and Cohomology
The Extension Problem
Automorphism Groups
Semidirect Products
Wreath Products
Factor Sets
Theorems of Schur-Zassenhaus and GaschiJtz
Transfer and Burnside's Theorem
Projective Representations and the Schur Multiplier
Derivations
CHAPTER 8
Some Simple Linear Groups
Finite Fields
The General Linear Group
PSL(2, K)
PSL(m, K)
Classical Groups
CHAPTER 9
Permutations and the Mathieu Groups
Multiple Transitivity
Primitive G-Sets
Simplicity Criteria
Atline Geometry
Projeetive Geometry
Sharply 3-Transitive Groups
Mathieu Groups
Steiner Systems
CHAPTER 10
Abelian Groups
Basics
Free Abelian Groups
Finitely Generated Abelian Groups
Divisible and Reduced Groups
Torsion Groups
Subgroups of
Character Groups
CHAPTER 11
Free Groups and Free Products
Generators and Relations
Semigroup Interlude
Coset Enumeration
Presentations and the Schur Multiplier
Fundamental Groups of Complexes
Tietze's Theorem
Covering Complexes
The Nielsen Schreier Theorem
Free Products
The Kurosh Theorem
The van Kampen Theorem
Amalgams
HNN Extensions
CHAPTER 12
The Word Problem
Introduction
Turing Machines
The Markov-Post Theorem
The Novikov-Boone-Britton Theorem: Sufficiency of Boone's
Lemma
Cancellation Diagrams
The Novikov-Boone-Britton Theorem: Necessity of Boone's
Lemma
The Higman Imbedding Theorem
Some Applications
Epilogue
APPENDIX I
Some Major Algebraic Systems
APPENDIX II
Equivalence Relations and Equivalence Classes
APPENDIX Ill
Functions
APPENDIX IV
Zorn's Lemma
APPENDIX V
Countability
APPENDIX VI
Commutative Rings
Bibliography
Notation
Index

相關詞條

熱門詞條

聯絡我們