《現代幾何學方法和套用第2卷(影印版)》是1999年11月世界圖書出版公司出版的圖書,作者是B.A.Dubrovin。
基本介紹
- 書名:現代幾何學方法和套用第2卷(影印版)
- 作者:B.A.Dubrovin
- ISBN:9787506201339
- 頁數:430
- 定價:72.00元
- 出版社:世界圖書出版公司
- 出版時間:1999-11
- 裝幀:Paperback
- 叢書: Graduate Texts in Mathematics
內容簡介,目錄,
內容簡介
Up until recently, Riemannian geometry and basic topology were not included, even by departments or faculties of mathematics, as compulsory subjects in a university-level mathematical education. The standard courses in the classical differential geometry of curves and surfaces which were given instead (and still are given in some places) have come gradually to be viewed as anachronisms. However, there has been hitherto no unanimous agreement as to exactly how such courses should be brought up to date, that is to say, which parts of modern geometry should be regarded as absolutely essential to a modern mathematical education, and what might be the appropriate levelof abstractness of their exposition.
本書為英文版。
目錄
CHAPTER1 Examples of Manifolds
1. The concept of a manifold
1.1. Definition of a manifold
1.2. Mappings of manifolds; tensors on manifolds
1.3. Embeddings and immersions of manifolds. Manifolds with boundary
2. The simplest examples of manifolds
2.1. Surfaces in Euclidean space. Transformation groups as manifolds
2.2. Projective spaces
2.3. Exercises
3. Essential facts from the theory of Lie groups
3.1. The structure of a neighbourhood of the identity of a Lie groupThe Lie algebra of a Lie group. Semisimplicity
3.2. The concept of a linear representation. An example of a non-matrix Lie group
4. Complex manifolds
4.1. Definitions and examples
4.2. Riemann surfaces as manifolds
5. The simplest homogeneous spaces
5.1. Action of a group on a manifold
5.2. Examples of homogeneous spaces
5.3. Exercises
6. Spaces of constant curvature (symmetric spaces)
6.1. The concept of a symmetric space
6.2. The isometry group of a manifold. Properties of its Lie algebra
6.3. Symmetric spaces of the first and second types
6.4. Lie groups as symmetric spaces
6.5. Constructing symmetric spaces. Examples
6.6. Exercises
7. Vector bundles on a manifold
7.1. Constructions involving tangent vectors
7.2. The normal vector bundle on a submanifold
CHAPTER 2 Foundational Questions. Essential Facts Concerning Functions on a Manifold. Typical Smooth Mappings
8. Partitions of unity and their applications
8.1. Partitions of unity
8.2. The simplest applications of partitions of unity. Integrals over a manifold and the general Stokes formula
8.3. Ihvariant metrics
9. The realization of compact manifolds as surfaces in R
10. Various properties of smooth maps of manifolds
10.1. Approximation of continuous mappings by smooth ones
10.2. Sard's theorem
10.3. Transversal regularity
10.4. Morse functions
11. Applications of Sard's theorem
11.1. The existence of embeddings and immersions
11.2. The construction of Morse functions as height functions
11.3. Focal points
CHAPTER 3 The Degree of a Mapping. The Intersection Index of Submanifolds Applications
12. The concept of homotopy
12.1. Definition of homotopy. Approximation ofcontinuous maps and homotopies by smooth ones
12.2. Relative homotopies
13. The degree ofa map
13.1. Definition ofdegree
13.2. Generalizations of the concept ofdegree
13.3. Classification of homotopy classes ofmaps from an arbitrary manifold to a sphere
13.4. The simplest examples
14. Applications of the degree of a mapping
14.1. The relationship between degree and integral
14.2. The degree of a vector field on a hypersurface
14.3. The Whitney number. The Gauss-Bonnet formula
14.4. The index of a singular point of a vector field
14.5. Transverse surfaces of a vector field. The Poincare-Bendixson theorem
15. The intersection index and applications
15.1. Definition of the intersection index
15.2. The total index of a vector field
……
CHAPTER 4 Orientability of Manifolds. The Fundamental Group Covering Spaces (Fibre Bundles with Discrete Fibre)
16. Orientability and homotopies of closed paths
17. The fundamental group
18. Covering maps and covering homotopies
19. Covering maps and the fundamental group. Computation of the fundamental group of certain manifolds
20. The discrete groups of motions of the Lobachevskian plane
CHAPTER 5 Homotopy Groups
21. Definition of the absolute and relative homotopy groups. Examples
22. Covering homotopies. The homotopy groups of covering spaces and loop spaces
23. Facts concerning the homotopy groups of spheres. Framed normal bundles. The Hopf invariant
CHAPTER 6 Smooth Fibre Bundles
24. The homotopy theory of fibre bundles
25. The differential geometry of fibre bundles
26. Knots and links. Braids
CHAPTER 7 Some Examples of Dynamical Systems and Foliations on Manifolds
27. The simplest concepts of the qualitative theory of dynamical systems Two-dimensional manifolds
28. Hamiltonian systems on manifolds. Liouville's theorem. Examples
29. Foliations
30. Variational problems involving higher derivatives
CHAPTER 8 The Global Structure of Solutions of Higher-Dimensional Variational Problems
31. Some manifolds arising in the general theory of relativity (GTR)
32. Some examples of global solutions of the Yang-Mills equations Chiral
33. The minimality of complex submanifolds
Bibliography
Index
1. The concept of a manifold
1.1. Definition of a manifold
1.2. Mappings of manifolds; tensors on manifolds
1.3. Embeddings and immersions of manifolds. Manifolds with boundary
2. The simplest examples of manifolds
2.1. Surfaces in Euclidean space. Transformation groups as manifolds
2.2. Projective spaces
2.3. Exercises
3. Essential facts from the theory of Lie groups
3.1. The structure of a neighbourhood of the identity of a Lie groupThe Lie algebra of a Lie group. Semisimplicity
3.2. The concept of a linear representation. An example of a non-matrix Lie group
4. Complex manifolds
4.1. Definitions and examples
4.2. Riemann surfaces as manifolds
5. The simplest homogeneous spaces
5.1. Action of a group on a manifold
5.2. Examples of homogeneous spaces
5.3. Exercises
6. Spaces of constant curvature (symmetric spaces)
6.1. The concept of a symmetric space
6.2. The isometry group of a manifold. Properties of its Lie algebra
6.3. Symmetric spaces of the first and second types
6.4. Lie groups as symmetric spaces
6.5. Constructing symmetric spaces. Examples
6.6. Exercises
7. Vector bundles on a manifold
7.1. Constructions involving tangent vectors
7.2. The normal vector bundle on a submanifold
CHAPTER 2 Foundational Questions. Essential Facts Concerning Functions on a Manifold. Typical Smooth Mappings
8. Partitions of unity and their applications
8.1. Partitions of unity
8.2. The simplest applications of partitions of unity. Integrals over a manifold and the general Stokes formula
8.3. Ihvariant metrics
9. The realization of compact manifolds as surfaces in R
10. Various properties of smooth maps of manifolds
10.1. Approximation of continuous mappings by smooth ones
10.2. Sard's theorem
10.3. Transversal regularity
10.4. Morse functions
11. Applications of Sard's theorem
11.1. The existence of embeddings and immersions
11.2. The construction of Morse functions as height functions
11.3. Focal points
CHAPTER 3 The Degree of a Mapping. The Intersection Index of Submanifolds Applications
12. The concept of homotopy
12.1. Definition of homotopy. Approximation ofcontinuous maps and homotopies by smooth ones
12.2. Relative homotopies
13. The degree ofa map
13.1. Definition ofdegree
13.2. Generalizations of the concept ofdegree
13.3. Classification of homotopy classes ofmaps from an arbitrary manifold to a sphere
13.4. The simplest examples
14. Applications of the degree of a mapping
14.1. The relationship between degree and integral
14.2. The degree of a vector field on a hypersurface
14.3. The Whitney number. The Gauss-Bonnet formula
14.4. The index of a singular point of a vector field
14.5. Transverse surfaces of a vector field. The Poincare-Bendixson theorem
15. The intersection index and applications
15.1. Definition of the intersection index
15.2. The total index of a vector field
……
CHAPTER 4 Orientability of Manifolds. The Fundamental Group Covering Spaces (Fibre Bundles with Discrete Fibre)
16. Orientability and homotopies of closed paths
17. The fundamental group
18. Covering maps and covering homotopies
19. Covering maps and the fundamental group. Computation of the fundamental group of certain manifolds
20. The discrete groups of motions of the Lobachevskian plane
CHAPTER 5 Homotopy Groups
21. Definition of the absolute and relative homotopy groups. Examples
22. Covering homotopies. The homotopy groups of covering spaces and loop spaces
23. Facts concerning the homotopy groups of spheres. Framed normal bundles. The Hopf invariant
CHAPTER 6 Smooth Fibre Bundles
24. The homotopy theory of fibre bundles
25. The differential geometry of fibre bundles
26. Knots and links. Braids
CHAPTER 7 Some Examples of Dynamical Systems and Foliations on Manifolds
27. The simplest concepts of the qualitative theory of dynamical systems Two-dimensional manifolds
28. Hamiltonian systems on manifolds. Liouville's theorem. Examples
29. Foliations
30. Variational problems involving higher derivatives
CHAPTER 8 The Global Structure of Solutions of Higher-Dimensional Variational Problems
31. Some manifolds arising in the general theory of relativity (GTR)
32. Some examples of global solutions of the Yang-Mills equations Chiral
33. The minimality of complex submanifolds
Bibliography
Index