书籍详情
基础拓扑和几何讲义
作者:(美)辛格 著
出版社:世界图书出版公司
出版时间:2009-03-01
ISBN:9787506292818
定价:¥39.00
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内容简介
At the present time, the average undergraduate mathematics major findsmathematics heavily compartmentalized. After the calculus, he takes a coursein analysis and a course in algebra. Depending upon his interests (or those ofhis department), he takes courses in special topics. If he is exposed to topology,it is usually straightforward point set topology; if he is exposed to geometry, it is usually classical differential geometry.
作者简介
暂缺《基础拓扑和几何讲义》作者简介
目录
Chapter Some point set topology
1.1 Naive set theory
1.2 Topological spaces
1.3 Connected and compact spaces
1.4 Continuous functions
1.5 Product spaces
1.6 The Tychonoff theorem
Chapter 2 More point set topology
2.1 Separation axioms
2.2 Separation by continuous functions
2.3 More separability
2.4 Complete metric spaces
2.5 Applications
Chapter 3 Fundamental group and covering spaces
3.1 Homotopy
3.2 Fundamental group
3.3 Covering spaces
Chapter 4 Simplicial complexes
4.1 Geometry of simplicial complexes
4.2 Baryccntric subdivisions
4.3 Simplicial approximation theorem
4.4 Fundamental group of a simplicial complex
Chapter 5 Manifolds
5.1 Differentiable manifolds
5.2 Differential forms
5.3 Miscellaneous facts
Chapter 6 Homology theory and the De Rham theory
6.1 Simplicial homology
6.2 Do Rham's theorem
Chapter 7 Intrinsic Riemannian geometry of surfaces
7.1 Parallel translation and connections
7.2 Structural equations and curvature
7.3 Interpretation of curvature
7.4 Geodesic coordinate systems
7.5 Isometrics and spaces of constant curvature
Chapter 8 Imbedded manifolds in Ra
Bibliography
Index
1.1 Naive set theory
1.2 Topological spaces
1.3 Connected and compact spaces
1.4 Continuous functions
1.5 Product spaces
1.6 The Tychonoff theorem
Chapter 2 More point set topology
2.1 Separation axioms
2.2 Separation by continuous functions
2.3 More separability
2.4 Complete metric spaces
2.5 Applications
Chapter 3 Fundamental group and covering spaces
3.1 Homotopy
3.2 Fundamental group
3.3 Covering spaces
Chapter 4 Simplicial complexes
4.1 Geometry of simplicial complexes
4.2 Baryccntric subdivisions
4.3 Simplicial approximation theorem
4.4 Fundamental group of a simplicial complex
Chapter 5 Manifolds
5.1 Differentiable manifolds
5.2 Differential forms
5.3 Miscellaneous facts
Chapter 6 Homology theory and the De Rham theory
6.1 Simplicial homology
6.2 Do Rham's theorem
Chapter 7 Intrinsic Riemannian geometry of surfaces
7.1 Parallel translation and connections
7.2 Structural equations and curvature
7.3 Interpretation of curvature
7.4 Geodesic coordinate systems
7.5 Isometrics and spaces of constant curvature
Chapter 8 Imbedded manifolds in Ra
Bibliography
Index
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