浸入
外观
数学上,浸入是微分流形之间的可微映射,其导数处处是单射。确切而言,f : M → N是浸入,若在M中每一点p,
都是单射。(TpX表示X在点p处的切空间。另一个等价说法是f是浸入,若f的秩是常数,且等于M的维数:
以上只要求f的导数为单射,但映射f未必是单射。
一个与浸入相关的概念是嵌入。光滑嵌入是一个单射浸入f : M → N而同时为拓扑嵌入,使得M与其在N中的像微分同胚。浸入正是局部嵌入,即对M中每一点x都有一个x的邻域U ⊂ M,使得f : U → N是嵌入。相反地,局部嵌入都是浸入。
若M是紧致的,则单射浸入是一个嵌入;若M不是紧致,则未必成立。这两者的关系就如同连续双射之于同胚。
参考
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