Collectionwise Hausdorff space explained

is said to be collectionwise Hausdorff if given any closed discrete subset of , there is a pairwise disjoint family of open sets with each point of the discrete subset contained in exactly one of the open sets.^[1]

Here a subset

being discrete has the usual meaning of being a discrete space with the subspace topology (i.e., all points of are isolated in ).^[2]

Properties

• Every T₁ space that is collectionwise Hausdorff is also Hausdorff.
• Every collectionwise normal space is collectionwise Hausdorff. (This follows from the fact that given a closed discrete subset

of , every singleton is closed in and the family of such singletons is a discrete family in .)

• Metrizable spaces are collectionwise normal and hence collectionwise Hausdorff.

Notes and References

1. FD Tall, The density topology, Pacific Journal of Mathematics, 1976
2. If

   X

   is T₁ space,

   S\subseteqX

   being closed and discrete is equivalent to the family of singletons

   \{\{s\}:s\inS\}

   being a discrete family of subsets of

   X

   (in the sense that every point of

   X

   has a neighborhood that meets at most one set in the family). If

   X

   is not T₁, the family of singletons being a discrete family is a weaker condition. For example, if

   X=\{a,b\}

   with the indiscrete topology,

   S=\{a\}

   is discrete but not closed, even though the corresponding family of singletons is a discrete family in

   X

   .