书籍详情
多复变量
作者:(德)格兰特 著
出版社:世界图书出版公司
出版时间:2009-08-01
ISBN:9787510005176
定价:¥29.00
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内容简介
The third chapter presents the Weierstrass formula and the Weierstrasspreparation theorem with applications to the ring of convergent powerseries. It is shown that this ring is a factorization, a Noetherian, and a Henselring. Furthermore we indicate how the obtained algebraic theorems can beapplied to the local investigation of analytic sets. One achieves deep resultsin this connection by using sheaf theory, the basic concepts of which arediscussed in the fourth chapter. In Chapter V we introduce complex manifoldsand give several examples. We also examine the different closures of C andthe effects of modifications on complex manifolds.
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目录
Chapter Ⅰ Holomorphic Functions
1 Power Series
2 Complex Differentiable Functions
3 The Cauchy Integral
4 Identity Theorems
5 Expansion in Reinhardt Domains
6 Real and Complex Differentiability
7 Holomorphic Mappings
Chapter Ⅱ Domains of Holomorphy
1 The Continuity Theorem
2 Pseudoconvexity
3 Holomorphic Convexity
4 The Thullen Theorem
5 Holomorphically Convex Domains:
6 Examples
7 Riemann Domains over Cn
8 Holomorphic Hulls
Chapter Ⅲ The Weierstrass Preparation Theorem
1 The Algebra of Power Series
2 The Weierstrass Formula
3 Convergent Power Series
4 Prime Factorization
5 Further Consequences (Hensel Rings, Noetherian Rings)
6 Analytic Sets
Chapter Ⅳ Sheaf Theory
1 Sheaves of Sets
2 Sheaves with Algebraic Structure
3 Analytic Sheaf Morphisms
4 Coherent Sheaves
Chapter Ⅴ Complex Manifolds
1 Complex Ringed Spaces
2 Function Theory on Complex Manifolds
3 Examples of Complex Manifolds
4 Closures of Cn
Chapter Ⅵ Cohomology Theory
1 Flabby Cohomology
2 The Cech Cohomology
3 Double Complexes
4 The Cohomology Sequence
5 Main Theorem on Stein Manifolds
Chapter Ⅶ Real Methods
1 Tangential Vectors
2 Differential Forms on Complex Manifolds
3 Cauchy Integrals
4 Dolbeault's Lemma
5 Fine Sheaves (Theorems of Dolbeault and de Rham)
List of symbols
Bibliography
Index
1 Power Series
2 Complex Differentiable Functions
3 The Cauchy Integral
4 Identity Theorems
5 Expansion in Reinhardt Domains
6 Real and Complex Differentiability
7 Holomorphic Mappings
Chapter Ⅱ Domains of Holomorphy
1 The Continuity Theorem
2 Pseudoconvexity
3 Holomorphic Convexity
4 The Thullen Theorem
5 Holomorphically Convex Domains:
6 Examples
7 Riemann Domains over Cn
8 Holomorphic Hulls
Chapter Ⅲ The Weierstrass Preparation Theorem
1 The Algebra of Power Series
2 The Weierstrass Formula
3 Convergent Power Series
4 Prime Factorization
5 Further Consequences (Hensel Rings, Noetherian Rings)
6 Analytic Sets
Chapter Ⅳ Sheaf Theory
1 Sheaves of Sets
2 Sheaves with Algebraic Structure
3 Analytic Sheaf Morphisms
4 Coherent Sheaves
Chapter Ⅴ Complex Manifolds
1 Complex Ringed Spaces
2 Function Theory on Complex Manifolds
3 Examples of Complex Manifolds
4 Closures of Cn
Chapter Ⅵ Cohomology Theory
1 Flabby Cohomology
2 The Cech Cohomology
3 Double Complexes
4 The Cohomology Sequence
5 Main Theorem on Stein Manifolds
Chapter Ⅶ Real Methods
1 Tangential Vectors
2 Differential Forms on Complex Manifolds
3 Cauchy Integrals
4 Dolbeault's Lemma
5 Fine Sheaves (Theorems of Dolbeault and de Rham)
List of symbols
Bibliography
Index
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