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| William M.Boothby 华盛顿大学圣路易斯分校数学系荣休教授, 于1949年在密歇根大学获得博士学位,师出拓扑学大师、沃尔夫奖得主Hassler Whitney门下。除在华盛顿大学仟教40余年外,他还在世界各地讲授微分流形,深受学生爱戴。... .. << 查看详细 |
| ⅰ. introduction to manifolds 1.preliminary comments on rn 2.rn and euclidean space 3.topological manifolds 4.further examples of manifolds. cutting and pasting 5.abstract manifolds. some examples ⅱ. functions of several variables and mappings 1.differentiability for functions of several variables 2.differentiability of mappings and jacobians 3.the space of tangent vectors at a point of rn 4.another definition of ta(rn) 5.vector fields on open subsets of rn 6.the inverse function theorem 7.the rank of a mapping ⅲ. differentiable manifolds and submanifolds 1.the definition of a differentiable manifold 2.further examples 3.differentiable functions and mappings 4.rank of a mapping, immersions 5.submanifolds . 6.lie groups 7.the action of a lie group on a manifold. transformation groups 8.the action of a discrete group on a manifold 9.covering manifolds ⅳ. vector fields on a manifold 1.the tangent space at a point of a manifold 2.vector fields 3.one-parameter and local one-parameter groups acting on a manifold 4.the existence theorem for ordinary differential equations 5.some examples of one-parameter groups acting on a manifold 6.one-parameter subgroups of lie groups 7.the lie algebra of vector fields on a manifold 8.frobenius's theorem 9.homogeneous spaces ⅴ. tensors and tensor fields on manifolds 1.tangent covectors 2.bilinear forms. the riemannian metric 3.riemannian manifolds as metric spaces 4.partitions of unity 5.tensor fields 6.multiplication of tensors 7.orientation of manifolds and the volume element 8.exterior differentiation ⅵ. integration on manifolds ⅶ. differentiation on riemannian manifolds ⅷ. curvature references index |
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