Collectionwise normal
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In mathematics, a topological space X is called collectionwise normal if for every discrete family Fi (i ∈ I) of closed subsets of X there exists a pairwise disjoint family of open sets Ui (i ∈ I), such that Fi ⊂ Ui. A family of subsets 
of subsets of X is called discrete when every point of X has a neighbourhood that intersects at most one of the sets from . An equivalent definition demands that the above Ui (i ∈ I) are themselves a discrete family, which is stronger than pairwise disjoint.
Many authors assume that X is also a T1 space as part of the definition.
The property is intermediate in strength between paracompactness and normality, and occurs in metrisation theorems.
[edit] Properties
- A collectionwise normal T1 space is collectionwise Hausdorff.
- A collectionwise normal space is normal.
- A paracompact space is collectionwise normal.
- An Fσ-set in a collectionwise normal space is also collectionwise normal in the subspace topology. In particular, this holds for closed subsets.
- The Moore metrisation theorem states that a collectionwise normal Moore space is metrisable.
[edit] References
- Engelking, Ryszard, General Topology, Heldermann Verlag Berlin, 1989. ISBN 3-88538-006-4
