Proof of Condition for a Topological Space to be Normal
Theorem
A topological space
is normal if and only if, for every closed set
and every open set
containingan open set
exists such that
Proof
Letbe a normal space. Letbe a closed set andan open set in
with
is closed and
andare disjoint closed sets hence open setsand
exist such that
and
Since
we have
and since
we have
The set
is closed hence
Now let
and
be disjoint closed sets then
and
is open. An open set exists such that
Since
we have
Also since
we have
Since
is open,
and
whereand are open sets.
