书籍详情
代数几何Ⅲ(续一影印版)
作者:(俄罗斯)帕尔申 等编著
出版社:科学出版社
出版时间:2009-01-01
ISBN:9787030234872
定价:¥66.00
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内容简介
The first contribution of this EMS volume on complex algebraic geometry touches upon many of the central problems in this vast and very active area of current research. While it is much too short to provide complete coverage of this subject, it provides a succinct summary of the areas it covers, while providing in-depth coverage of certain very important fields. The second part provides a brief and lucid introduction to the recent work on the interactions between the classical area of the geometry of complex algebraic curves and their Jacobian varieties,and partial differential equations of mathematical physics. The paper discusses the.work of Mumford, Novikov, Krichever, and Shiota,and would be an excellent companion to the older classics on the subject.
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目录
Introduction
Chapter 1. Classical Hodge Theory
1. Algebraic Varieties
2. Complex Manifolds
3. A Comparison Between Algebraic Varieties and Analytic Spaces
4. Complex Manifolds as C Manifolds
5. Connections on Holomorphic Vector Bundles
6. Hermitian Manifolds
7. Kahler Manifolds
8. Line Bundles and Divisors
9. The Kodaira Vanishing Theorem
10. Monodromy
Chapter 2. Periods of Integrals on Algebraic Varieties
1. Classifying Space
2. Complex Tori
3. The Period Mapping
4. Variation of Hodge Structures
5. Torelli Theorems
6. Infinitesimal Variation of Hodge Structures
Chapter 3. Torelli Theorems
1. Algebraic Curves
2. The Cubic Threefold
3. K3 Surfaces and Elliptic Pencils
4. Hypersurfaces
5. Counterexamples to Torelli Theorems
Chapter 4. Mixed Hodge Structures
1. Definition of mixed Hodge structures
2. Mixed Hodge structure on the Cohomology of a Complete Variety with Normal Crossings
3. Cohomology of Smooth Varieties
4. The Invariant Subspace Theorem
5. Hodge Structure on the Cohomology of Smooth Hypersurfaces
6. Further Development of the Theory of Mixed Hodge Structures
Chapter 5. Degenerations of Algebraic Varieties
1. Degenerations of Manifolds
2. The Limit Hodge Structure
3. The Clemens-Schmid Exact Sequence
4. An Application of the Clemens-Schmid Exact Sequence to the Degeneration of Curves
5. An Application of the Clemens-Schmid Exact Sequence to
Surface Degenerations. The Relationship Between the Numerical
Invariants of the Fibers Xt and X0
6. The Epimorphicity of the Period Mapping for K3 Surfaces
Comments on the bibliography
References
Index
Chapter 1. Classical Hodge Theory
1. Algebraic Varieties
2. Complex Manifolds
3. A Comparison Between Algebraic Varieties and Analytic Spaces
4. Complex Manifolds as C Manifolds
5. Connections on Holomorphic Vector Bundles
6. Hermitian Manifolds
7. Kahler Manifolds
8. Line Bundles and Divisors
9. The Kodaira Vanishing Theorem
10. Monodromy
Chapter 2. Periods of Integrals on Algebraic Varieties
1. Classifying Space
2. Complex Tori
3. The Period Mapping
4. Variation of Hodge Structures
5. Torelli Theorems
6. Infinitesimal Variation of Hodge Structures
Chapter 3. Torelli Theorems
1. Algebraic Curves
2. The Cubic Threefold
3. K3 Surfaces and Elliptic Pencils
4. Hypersurfaces
5. Counterexamples to Torelli Theorems
Chapter 4. Mixed Hodge Structures
1. Definition of mixed Hodge structures
2. Mixed Hodge structure on the Cohomology of a Complete Variety with Normal Crossings
3. Cohomology of Smooth Varieties
4. The Invariant Subspace Theorem
5. Hodge Structure on the Cohomology of Smooth Hypersurfaces
6. Further Development of the Theory of Mixed Hodge Structures
Chapter 5. Degenerations of Algebraic Varieties
1. Degenerations of Manifolds
2. The Limit Hodge Structure
3. The Clemens-Schmid Exact Sequence
4. An Application of the Clemens-Schmid Exact Sequence to the Degeneration of Curves
5. An Application of the Clemens-Schmid Exact Sequence to
Surface Degenerations. The Relationship Between the Numerical
Invariants of the Fibers Xt and X0
6. The Epimorphicity of the Period Mapping for K3 Surfaces
Comments on the bibliography
References
Index
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