简介
Upon David Hoffman fell the difficult task of transforming the tightly constructed German text into one which would mesh well with the more relaxed format of the Graduate Texts in Mathematics series. There are some elaborations and several new figures have been added. I trust that the merits of the German edition have survived whereas at the same time the efforts of David helped to elucidate the general conception of the Course where we tried to put Geometry before Formalism without giving up mathematical rigour.
本书为英文版。
目录
chapter 0
calculus in euclidean space
0.1 euclidean space
0.2 the topology of euclidean space
0.3 differentiation in rn
0.4 tangent space
0.5 local behavior of differentiable functions (injective and surjective functions)
chapter 1
curves
1.1 definitions
1.2 the frenet frame
1.3 the frenet equations
1.4 plane curves; local theory
1.5 space curves
1.6 exercises
chapter 2
plane curves: global theory
2.1 the rotation number
2.2 the umlaufsatz
2.3 convex curves
.2.4 exercises and some further results
chapter 3
surfaces: local theory
3.1 definitions
3.2 the first fundamental form
3.3 the second fundamental form
3.4 curves on surfaces
3.5 principal curvature, gauss curvature, and mcan curvature
3.6 normal form for a surface, special coordinates
3.7 special surfaces, developable surfaces
3.8 the gauss and codazzi-mainardi equations
3.9 exercises and some further results
chapter 4
intrinsic geometry of surfaces: local theory
4.1 vector fields and covariant differentiation
4.2 parallel translation
4.3 geodesics
4.4 surfaces of constant curvature
4.5 examples and exercises
chapter 5
two-dimensional riemannian geometry
5.1 local riemannian geometry
5.2 the tangent bundle and the exponential map
5.3 geodesic polar coordinates
5.4 jacobi fields
5.5 manifolds
5.6 differential forms
5.7 exercises and some further results
chapter 6
the global geometry of surfaces
6.1 surfaces in euclidean space
6.2 ovaloids
6.3 the gauss-bonnet theorem
6.4 completeness
6.5 conjugate points and curvature
6.6 curvature and the global geometry of a surface
6.7 closed geodesics and the fundamental group
6.8 exercises and some further results
references
index
index of symbols
calculus in euclidean space
0.1 euclidean space
0.2 the topology of euclidean space
0.3 differentiation in rn
0.4 tangent space
0.5 local behavior of differentiable functions (injective and surjective functions)
chapter 1
curves
1.1 definitions
1.2 the frenet frame
1.3 the frenet equations
1.4 plane curves; local theory
1.5 space curves
1.6 exercises
chapter 2
plane curves: global theory
2.1 the rotation number
2.2 the umlaufsatz
2.3 convex curves
.2.4 exercises and some further results
chapter 3
surfaces: local theory
3.1 definitions
3.2 the first fundamental form
3.3 the second fundamental form
3.4 curves on surfaces
3.5 principal curvature, gauss curvature, and mcan curvature
3.6 normal form for a surface, special coordinates
3.7 special surfaces, developable surfaces
3.8 the gauss and codazzi-mainardi equations
3.9 exercises and some further results
chapter 4
intrinsic geometry of surfaces: local theory
4.1 vector fields and covariant differentiation
4.2 parallel translation
4.3 geodesics
4.4 surfaces of constant curvature
4.5 examples and exercises
chapter 5
two-dimensional riemannian geometry
5.1 local riemannian geometry
5.2 the tangent bundle and the exponential map
5.3 geodesic polar coordinates
5.4 jacobi fields
5.5 manifolds
5.6 differential forms
5.7 exercises and some further results
chapter 6
the global geometry of surfaces
6.1 surfaces in euclidean space
6.2 ovaloids
6.3 the gauss-bonnet theorem
6.4 completeness
6.5 conjugate points and curvature
6.6 curvature and the global geometry of a surface
6.7 closed geodesics and the fundamental group
6.8 exercises and some further results
references
index
index of symbols
- 名称
- 类型
- 大小
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