书籍详情
幺半群理论的同调方法(英文版)
作者:Javed Ahsan、Liu Zhongkui
出版社:科学出版社
出版时间:2008-01-01
ISBN:9787030201034
定价:¥56.00
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内容简介
This book offers a comprehensive survey of the area of monoids. It includes injective and weakly injective S-acts, the concept of projective S-acts, some fundamental and interesting results concerning strong flatness, condition(P) and flatness of S-acts, some results on homological classification of monoids, the study of sheaves for classes of monoids and S-acts, analogous to the sheaves for classes of rings and modules. This volume will be of interest to researchers, graduate students and scientists of mathematics.
作者简介
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目录
Preface
Chapter 1 Fundamental Concepts
1.1 Relations and Lattices
1.2 Categories and Functors
1.3 Basic Concepts in Semigroups
1.4 S-acts and S-homomorphisms
1.5 Prime and Semiprime S-acts over Monoids with Zero
Chapter 2 Injective and Weakly Injective S-Acts and Related Concepts
2.1 Injective S-acts
2.2 Weakly Injective S-acts
2.3 Completely Right Injective Monoids
2.4 Quasi-injective S-acts and Completely Quasi-injective Monoids
Chapter 3 Relatively Injective S-acts and Related Concepts
3.1 P-injective and Divisible S-acts
3.2 Characterization of Monoids by P-injective S-acts
3.3 Weakly Regular Monoids and Normal S-acts
3.4 Hereditary and Semihereditary Monoids
3.5 Hereditary and Cohereditary S-acts
3.6 Completely Right FSF-injective Monoids
Chapter 4 Projective S-Acts
4.1 Projective S-acts
4.2 Completely Right Projective Monoids
4.3 Quasi-projective S-acts
4.4 (x,y)-projective S-acts
4.5 Products of Projective S-acts
4.6 Projective Acts over Factorisable Semigroups
Chapter 5 Flat S-Acts
5.1 The Functor
5.2 Flatness and Condition (P)
5 3 Strongly Flat S-acts
Chapter 6 Homological Classification of Monoids by Flatness
6.1 Strong Flatness of Condition (P) Acts
6.2 Condition (P) Property of Flat Acts
6.3 Strong Flatness of Flat Acts
6.4 Right Perfect Monoids
Chapter 7 Some Topics Relative to Flatness
7.1 von Neumann Regular Monoids
7.2 Regularity and Flatness of Acts
7.3 Relative Flatness and Strongly Faithful Acts
7.4 Purity of Acts
7.5 Flatness in SPOS
Chapter 8 Sheaves for Classes of Monoids
8.1 A Historical Introduction of Sheaf Theory in Algebra
8.2 Sheaves of von Neumann Regular Monoids with Zero
8.3 Pure Ideals of a Monoid with Zero
8.4 Pure Spectrum of a Monoid with Zero
8.5 S-acts
8.6 First Representation Theorem
8.7 Second Representation Theorem
Bibliography
Index
Chapter 1 Fundamental Concepts
1.1 Relations and Lattices
1.2 Categories and Functors
1.3 Basic Concepts in Semigroups
1.4 S-acts and S-homomorphisms
1.5 Prime and Semiprime S-acts over Monoids with Zero
Chapter 2 Injective and Weakly Injective S-Acts and Related Concepts
2.1 Injective S-acts
2.2 Weakly Injective S-acts
2.3 Completely Right Injective Monoids
2.4 Quasi-injective S-acts and Completely Quasi-injective Monoids
Chapter 3 Relatively Injective S-acts and Related Concepts
3.1 P-injective and Divisible S-acts
3.2 Characterization of Monoids by P-injective S-acts
3.3 Weakly Regular Monoids and Normal S-acts
3.4 Hereditary and Semihereditary Monoids
3.5 Hereditary and Cohereditary S-acts
3.6 Completely Right FSF-injective Monoids
Chapter 4 Projective S-Acts
4.1 Projective S-acts
4.2 Completely Right Projective Monoids
4.3 Quasi-projective S-acts
4.4 (x,y)-projective S-acts
4.5 Products of Projective S-acts
4.6 Projective Acts over Factorisable Semigroups
Chapter 5 Flat S-Acts
5.1 The Functor
5.2 Flatness and Condition (P)
5 3 Strongly Flat S-acts
Chapter 6 Homological Classification of Monoids by Flatness
6.1 Strong Flatness of Condition (P) Acts
6.2 Condition (P) Property of Flat Acts
6.3 Strong Flatness of Flat Acts
6.4 Right Perfect Monoids
Chapter 7 Some Topics Relative to Flatness
7.1 von Neumann Regular Monoids
7.2 Regularity and Flatness of Acts
7.3 Relative Flatness and Strongly Faithful Acts
7.4 Purity of Acts
7.5 Flatness in SPOS
Chapter 8 Sheaves for Classes of Monoids
8.1 A Historical Introduction of Sheaf Theory in Algebra
8.2 Sheaves of von Neumann Regular Monoids with Zero
8.3 Pure Ideals of a Monoid with Zero
8.4 Pure Spectrum of a Monoid with Zero
8.5 S-acts
8.6 First Representation Theorem
8.7 Second Representation Theorem
Bibliography
Index
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