拓扑流形

一个 ${\displaystyle n}$  维拓扑流形（或简称流形）是一个拓扑空间 ${\displaystyle M}$  ，满足以下性质^[1]：

1. ${\displaystyle M}$  是豪斯多夫空间。
2. ${\displaystyle M}$  是第二可数空间。
3. 对于每个 ${\displaystyle M}$  中的点，找的到一个该点的邻域 ${\displaystyle U}$  ，使得 ${\displaystyle U}$  和 ${\displaystyle \mathbb {R} ^{n}}$  同胚。

• 连续函数的图形。
• ${\displaystyle n}$  维的球体。
• ${\displaystyle n}$  维射影空间。
• 环面

• ${\displaystyle n}$  维欧几里得空间 ${\displaystyle \mathbb {R} ^{n}}$  是一个 ${\displaystyle n}$  维拓扑流形。
• 离散空间是一个 ${\displaystyle 0}$  维拓扑流形。
• 圆形是一个紧致的 ${\displaystyle 1}$  维拓扑流形。
• 环面和克莱因瓶是紧致的 ${\displaystyle 2}$  维拓扑流形。
• ${\displaystyle n}$  维的球面是一个紧致的 ${\displaystyle n}$  维流形。
• ${\displaystyle n}$  维的环面是一个紧致的 ${\displaystyle n}$  维流形。

• Projective spaces over the reals, complexes, or quaternions are compact manifolds.
  • Real projective space RPⁿ is a n-dimensional manifold.
  • Complex projective space CPⁿ is a 2n-dimensional manifold.
  • Quaternionic projective space HPⁿ is a 4n-dimensional manifold.
• Manifolds related to projective space include Grassmannians, flag manifolds, and Stiefel manifolds.

• Differentiable manifolds are a class of topological manifolds equipped with a differential structure.
• Lens spaces are a class of differentiable manifolds that are quotients of odd-dimensional spheres.
• Lie groups are a class of differentiable manifolds equipped with a compatible group structure.
• The E8 manifold is a topological manifold which cannot be given a differentiable structure.

引用

书籍

• （英文）Lee, John M. Introduction to Smooth Manifolds. Springer New York. 2012.