Homologically Euclidean point: Difference between revisions

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* [[Closed Euclidean point]]
* [[Closed Euclidean point]]


In particular any point in a <math>n</math>-manifold is homologically <math>n</math>-Euclidean.
In particular any point in a <math>n</math>-[[manifold]] or a <math>n</math>-[[locally Euclidean space]] is homologically <math>n</math>-Euclidean.
 
See also [[point-deletion inclusion]].

Latest revision as of 19:46, 11 May 2008

Definition

A point p in a topological space M is termed homologically n-Euclidean if:

Hn(M,Mp)=Z

and:

Hi(M,Mp)=0in

Relation with other properties

Stronger properties

In particular any point in a n-manifold or a n-locally Euclidean space is homologically n-Euclidean.

See also point-deletion inclusion.