Normality is weakly hereditary
This article gives the statement, and possibly proof, of a topological space property (i.e., normal space) satisfying a topological space metaproperty (i.e., weakly hereditary property of topological spaces)
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Statement
Verbal statement
Any closed subset of a normal space is also normal, in the subspace topology.
Definitions used
Normal space
Further information: normal space
Subspace topology
Further information: subspace topology
Proof
Proof outline
Note that the property of being a T1 space is certainly hereditary to all subspaces, so we only need to check the separation of closed subsets.
We proceed as follows:
- Pick two closed subsets inside the subspace
- Observe, using the fact that a closed subspace of a closed subspace is closed, that both of them are closed in the whole space
- Separate them by disjoint open sets in the whole space
- Intersect these with the subspace, and use the definition of subspace topology to conclude that we have a separation by disjoint open sets in the subspace
References
Textbook references
- Topology (2nd edition) by James R. Munkres, More info, Page 205, Exercise 1, Chapter 4, Section 32