Difference between revisions of "Normal topological space"

Revision as of 00:12, 4 May 2016

A topological space, $(X,\mathcal{ J })$ , is said to be normal if^[1]:

$\forall E,F\in C(\mathcal{J})\ \exists U,V\in\mathcal{J}[E\cap F=\emptyset\implies(U\cap V=\emptyset\wedge E\subseteq U\wedge F\subseteq V)]$ - (here $C(\mathcal{J})$ denotes the collection of closed sets of the topology, $\mathcal{J}$ )

TODO: Make that sentence easier to read

@@ Line 1: / Line 1: @@
 ==[[Normal topological space/Definition|Definition]]==
 {{:Normal topological space/Definition}}
+==Equivalent statements==
+* [[A topological space is normal if and only if for each closed set, E, and each open set, W, containing E there exists an open set U containing E such that the closure of U is strictly a subset of W]]
+{{Todo|Make that sentence easier to read}}
 ==See also==
 * [[Topological separation axioms]]