In mathematics, a topological space is called collectionwise normal if for every discrete family F<sub>i</sub> (i ∈ I) of closed subsets of there exists a pairwise disjoint family of open sets U<sub>i</sub> (i ∈ I), such that F<sub>i</sub> â U<sub>i</sub>. Here a family of subsets of is called discrete when every point of has a neighbourhood that intersects at most one of the sets from . An equivalent definition of collectionwise normal demands that the above U<sub>i</sub> (i ∈ I) themselves form a discrete family, which is a priori stronger than pairwise disjoint.
Some authors assume that is also a T<sub>1</sub> space as part of the definition, but no such assumption is made here.
The property is intermediate in strength between paracompactness and normality, and occurs in metrization theorems.
A topological space X is called hereditarily collectionwise normal if every subspace of X with the subspace topology is collectionwise normal.
In the same way that hereditarily normal spaces can be characterized in terms of separated sets, there is an equivalent characterization for hereditarily collectionwise normal spaces. A family of subsets of X is called a separated family if for every i, we have , with cl denoting the closure operator in X, in other words if the family of is discrete in its union. The following conditions are equivalent: