作者:温特劳斯(Weintraub,S.H.)
页数:395
出版社:哈尔滨工业大学出版社
出版日期:2015
ISBN:9787560355184
电子书格式:pdf/epub/txt
内容简介
《微分形式:理论与练习(英文版)》主要包括Differential Forms in Rn,Ⅰ、Differential Forms in Rn,Ⅱ、Push—forwards and Pull—backs in Rn、Smooth Manifolds、Vector Bundles and the Global Point of View等内容。
本书特色
本书英文影印版由 Elsevier (Singapore) Pte Ltd. 授权哈尔滨工业大学出版社在中国大陆境内独家发行。本版仅限在中国境内(不包括香港、澳门以及台湾)出版及标价销售。未经许可之出口,视为违反著作权法,将受民事及刑事法律之制裁。
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目录
Preface
1 Differential Forms in Rn,Ⅰ
1.0 Euclidean spaces,tangent spaces,and tangent vector fields
1.1 The algebra of differential forms
1.2 Exterior differentiation
1.3 The fundamental correspondence
1.4 The Converse of Poincaré’s Lemma,Ⅰ
1.5 Exercises
2 Differential Forms in Rn ,Ⅱ
2.1 1-Forms
2.2 k-Forms
2.3 Orientation and signed volume
2.4 The Converse of Poincaré’s Lemma,Ⅱ
2.5 Exercises
3 Push-forwards and Pull-backs in Rn
3.1 Tangent vectors
3.2 Points,tangent vectors,and push-forwards
3.3 Differential forms and pull-backs
3.4 Pull-backs,products,and exterior derivatives
3.5 Smooth homotopies and the Converse of Poincaré’s Lemma,Ⅲ
3.6 Exercises
4 Smooth Manifolds
4.1 The notion of a smooth manifold
4.2 Tangent vectors and differential forms
4.3 Further constructions
4.4 Orientations of manifolds intuitive discussion
4.5 Orientations of manifolds—careful development
4.6 Partitions of unity
4.7 Smooth homotopies and the Converse of Poincaré’s Lemma in general
4.8 Exercises
5 Vector Bundles and the Global point of View
5.1 The definition of a vector bundle
5.2 The dual bundle,and related bundles
5.3 The tangent bundle of a smooth manifold,and related bundles
5.4 Exercises
6 Integration of Differential Forms
6.1 Definite integrals in Rn
6.2 Definition of the integral in general
6.3 The integral of a O-form over a point
6.4 The integral of a 1-form over a curve
6.5 The integral of a 2-form over a surface
6.6 The integral of a 3-form over a solid body
6.7 Chains and integration on chains
6.8 Exercises
7 The Generalized Stokes’s Theorem
7.1 Statement of the theorem
7.2 The fundamental theorem of ca1culus and its analog for line integrals
7.3 Cap independence
7.4 Green’s and Stokes’s theorems
7.5 Gauss’s theorem
7.6 Proof of the GST
7.7 The converse of the GST
7.8 Exercises
8 de Rham Cohomology
8.1 Linear and homological algebra constructions
8.2 Definition and basic properties
8.3 Computations if cohomology groups
8.4 Cohomology with compact supports
8.5 Exercises
Index
1 Differential Forms in Rn,Ⅰ
1.0 Euclidean spaces,tangent spaces,and tangent vector fields
1.1 The algebra of differential forms
1.2 Exterior differentiation
1.3 The fundamental correspondence
1.4 The Converse of Poincaré’s Lemma,Ⅰ
1.5 Exercises
2 Differential Forms in Rn ,Ⅱ
2.1 1-Forms
2.2 k-Forms
2.3 Orientation and signed volume
2.4 The Converse of Poincaré’s Lemma,Ⅱ
2.5 Exercises
3 Push-forwards and Pull-backs in Rn
3.1 Tangent vectors
3.2 Points,tangent vectors,and push-forwards
3.3 Differential forms and pull-backs
3.4 Pull-backs,products,and exterior derivatives
3.5 Smooth homotopies and the Converse of Poincaré’s Lemma,Ⅲ
3.6 Exercises
4 Smooth Manifolds
4.1 The notion of a smooth manifold
4.2 Tangent vectors and differential forms
4.3 Further constructions
4.4 Orientations of manifolds intuitive discussion
4.5 Orientations of manifolds—careful development
4.6 Partitions of unity
4.7 Smooth homotopies and the Converse of Poincaré’s Lemma in general
4.8 Exercises
5 Vector Bundles and the Global point of View
5.1 The definition of a vector bundle
5.2 The dual bundle,and related bundles
5.3 The tangent bundle of a smooth manifold,and related bundles
5.4 Exercises
6 Integration of Differential Forms
6.1 Definite integrals in Rn
6.2 Definition of the integral in general
6.3 The integral of a O-form over a point
6.4 The integral of a 1-form over a curve
6.5 The integral of a 2-form over a surface
6.6 The integral of a 3-form over a solid body
6.7 Chains and integration on chains
6.8 Exercises
7 The Generalized Stokes’s Theorem
7.1 Statement of the theorem
7.2 The fundamental theorem of ca1culus and its analog for line integrals
7.3 Cap independence
7.4 Green’s and Stokes’s theorems
7.5 Gauss’s theorem
7.6 Proof of the GST
7.7 The converse of the GST
7.8 Exercises
8 de Rham Cohomology
8.1 Linear and homological algebra constructions
8.2 Definition and basic properties
8.3 Computations if cohomology groups
8.4 Cohomology with compact supports
8.5 Exercises
Index
