Equivalences
For a topological space X, the following are equivalent:
- X is a Hausdorff space.
- Limits of nets in X are unique.
- Limits of filters on X are unique.
- Any singleton set {x} ⊂ X is equal to the intersection of all closed neighbourhoods of x. (A closed neighbourhood of x is a closed set that contains an open set containing x.)
- The diagonal Δ = {(x,x) | x ∈ X} is closed as a subset of the product space X × X.
Read more about this topic: Hausdorff Space
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