线性代数群
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作者: (美)以弗莱斯著
出 版 社:
出版时间: 2009-4-1字数:版次: 1页数: 253印刷时间:开本: 16开印次: 1纸张:I S B N : 9787510004414包装: 平装目录
Ⅰ.Algebraic Geometry
0.Some Commutative Algebra
1.Affine and Projective Varieties
1.1 Ideals and Afline Varieties
1.2 Zariski Topology on Affine Space
1.3 Irreducible Components
1.4 Products of Affine Varieties
1.5 Affine Algebras and Morphisms
1.6 Projective Varieties
1.7 Products of Projective Varieties
1.8 Flag Varieties
2.Varieties
2.1 Local Rings
2.2 Prevarieties
2.3 Morphisms
2.4 Products
2.5 Hausdorff Axiom
3.Dimension
3.1 Dimension of a Variety
3.2 Dimension of a Subvariety
3.3 Dimension Theorem
3.4 Consequences
4.Morphisms
4.1 Fibres of a Morphism
4.2 Finite Morphisms
4.3 Image ofa Morphism
4.4 Constructible Sets
4.5 Open Morphisms
4.6 Bijective Morphisms
4.7 Birational Morphisms
5.Tangent Spaces
5.1 Zariski Tangent Space
5.2 Existence of Simple Points
5.3 Local Ring of a Simple Point
5.4 Differential of a Morphism.
5.5 Differential Criterion for Separability
6.Complete Varieties
6.1 Basic Properties
6.2 Completeness of Projective Varieties
6.3 Varieties Isomorphic to P
6.4 Automorphisms of P
Ⅱ.Afline Algebraic Groups
7.Basic Concepts and Examples
7.1 The Notion of Algebraic Group
7.2 Some Classical Groups
7.3 Identity Component
7.4 Subgroups and Homomorphisms.
7.5 Generation by Irreducible Subsets
7.6 HopfAIgebras
8.Actions of Algebraic Groups on Varieties
8.1 Group Actions
8.2 Actions of Algebraic Groups
8.3 Closed Orbits
8.4 Semidirect Products
8.5 Translation of Functions
8.6 Linearization of Affine Groups
Ⅲ.Lie Algebras
9.Lie Algebra of an Algebraic Group
9.1 Lie Algebras and Tangent Spaces
9.2 Convolution
9.3 Examples.
9.4 Subgroups and Lie Subalgebras
9.5 Dual Numbers
10.Differentiation.
10.1 Some Elementary Formulas
10.2 Differential of Right Translation
10.3 The Adjoint Representation
10.4 Differential of Ad
10.5 Commutators
10.6 Centralizers
10.7 Automorphisms and Derivations
Ⅳ.Homogeneous Spaces
11.Construction of Certain Representations
11.1 Action on Exterior Powers
11.2 A Theorem of Chevalley
11.3 Passage to Projective Space
11.4 Characters and Semi-lnvariants.
11.5 Normal Subgroups
12.Quotients
Ⅴ.Characteristic O Theory
Ⅵ.Semisimple and Unipotent Elements
Ⅶ.Solvable Groups
Ⅷ.Borel Subgroups
Ⅸ.Centralizers of Tori
Ⅹ.Structure of Reductive Groups
Ⅺ.Representatins and Classfication of Semisimple Groups
Ⅻ.Survey of Rationality Properties
Appendix Root Systems
Bibliography
Index of Terminology
Index of Symbols
