作者:(俄罗斯)沙法列维奇
页数:258
出版社:科学出版社
出版日期:2016
ISBN:9787030166913
电子书格式:pdf/epub/txt
内容简介
POD产品说明:
1. 本产品为按需印刷(POD)图书,实行先付款,后印刷的流程。您在页面购买且完成支付后,订单转交出版社。出版社根据您的订单采用数字印刷的方式,单独为您印制该图书,属于定制产品。
2. 按需印刷的图书装帧均为平装书(含原为精装的图书)。由于印刷工艺、彩墨的批次不同,颜色会与老版本略有差异,但通常会比老版本的颜色更准确。原书内容含彩图的,统一变成黑白图,原书含光盘的,统一无法提供光盘。
3. 按需印刷的图书制作成本高于传统的单本成本,因此售价高于原书定价。
4. 按需印刷的图书,出版社生产周期一般为15个工作日(特殊情况除外)。请您耐心等待。
5. 按需印刷的图书,属于定制产品,不可取消订单,无质量问题不支持退货。
本书特色
《代数学基础》论述代数学及其在现代数学和科学中的地位,高度原创且内容充实。作者通过讨论大学代数课程,如李群、上同调、范畴论等,阐述每个代数概念的起源与物理现象及其他数学分支之间的联系。《代数学基础》为数学家必读,无论他是初学代数学还是代数学专家。
目录
Preface
1.What is Algebra?
2.Fields
3.Commutative Rings
4.Homomorphisms and Ideals
5.Modules
6.Algebraic Aspects of Dimension
7.The Algebraic View of Infinitesimal Notions
8.Noncommutative Rings
9.Modules over Noncommutative Rings
10.Semisimple Modules and Rings
11.DivisioAlgebras of Finite Rank
12.The Notioof a Group
13.Examples of Groups: Finite Groups
14.Examples of Groups: Infinite Discrete Groups
15.Examples of Groups: Lie Groups and Algebraic Groups
16.General Results of Group Theory
17.Group Representations
A.Representations of Finite Groups
B.Representations of Compact Lie Groups
18.Some Applications of Groups
A.Galois Theory
B.The Galois Theory of Linear Differential Equations (Picard Vessiot Theory)
C.Classificatioof Unramified Covers
D.Invariant Theory
E.Group Representations and the Classificatioof Elementary Particles
19.Lie Algebras and Nonassociative Algebra
A.Lie Algebras
B.Lie Theory
C.Applications of Lie Algebras
D.Other Nonassociative Algebras
20.Categories
21.Homological Algebra
A.Topological Origins of the Notions of Homological Algebra
B.Cohomology of Modules and Groups
C.Sheaf Cohomology
22.K—theory
A.Topological K—theory
B.Algebraic K—theory
Comments othe Literature
References
Index of Names
Subject Index
1.What is Algebra?
2.Fields
3.Commutative Rings
4.Homomorphisms and Ideals
5.Modules
6.Algebraic Aspects of Dimension
7.The Algebraic View of Infinitesimal Notions
8.Noncommutative Rings
9.Modules over Noncommutative Rings
10.Semisimple Modules and Rings
11.DivisioAlgebras of Finite Rank
12.The Notioof a Group
13.Examples of Groups: Finite Groups
14.Examples of Groups: Infinite Discrete Groups
15.Examples of Groups: Lie Groups and Algebraic Groups
16.General Results of Group Theory
17.Group Representations
A.Representations of Finite Groups
B.Representations of Compact Lie Groups
18.Some Applications of Groups
A.Galois Theory
B.The Galois Theory of Linear Differential Equations (Picard Vessiot Theory)
C.Classificatioof Unramified Covers
D.Invariant Theory
E.Group Representations and the Classificatioof Elementary Particles
19.Lie Algebras and Nonassociative Algebra
A.Lie Algebras
B.Lie Theory
C.Applications of Lie Algebras
D.Other Nonassociative Algebras
20.Categories
21.Homological Algebra
A.Topological Origins of the Notions of Homological Algebra
B.Cohomology of Modules and Groups
C.Sheaf Cohomology
22.K—theory
A.Topological K—theory
B.Algebraic K—theory
Comments othe Literature
References
Index of Names
Subject Index
![国外数学名著系列(续一)(影印版):动力系统[ 奇异理论II:应用 VⅢ]-技术教育社区](https://image12.bookschina.com/2018/20180525/B7685949.jpg)
![国外数学名著系列(续一)(影印版):几何[ 最小曲面 Ⅴ]-技术教育社区](https://image12.bookschina.com/2018/20180525/B7685948.jpg)
![国外数学名著系列(续一)(影印版):动力系统[ 旋涡的一般理论 Ⅹ]-技术教育社区](https://image12.bookschina.com/2017/20170406/B7343609.jpg)