a space is T1 if and only if every singleton is closed

Say $X$ is a http://planetmath.org/node/1852 $T_{1}$ topological space. Let’s show that $\{x\}$ is closed for every $x\in X$ :

The $T_{1}$ axiom (http://planetmath.org/T1Space) gives us, for every $y$ distinct from $x$ , an open $U_{y}$ that contains $y$ but not $x$ . Since we’re in a topological space, we can take the union of all these open sets to get a new open set,

U=\bigcup_{y\neq x}U_{y}.

$\{x\}$ is the complement of $U$ , closed because $U$ is open: None of the $U_{y}$ contain $x$ , so $U$ doesn’t contain $x$ . But any $y\neq x$ is in $U$ , since $y\in U_{y}\subset U$ . That takes care of that.

Now let’s say we have a topological space $X$ in which $\{x\}$ is closed for every $x\in X$ . We’d like to show that $T_{1}$ holds:

Given $x\neq y$ , we want to find an open set that contains $x$ but not $y$ . $\{y\}$ is closed by hypothesis, so its complement is open, and our search is over.

Title	a space is T1 if and only if every singleton is closed
Canonical name	ASpaceIsT1IfAndOnlyIfEverySingletonIsClosed
Date of creation	2013-03-22 14:20:15
Last modified on	2013-03-22 14:20:15
Owner	waj (4416)
Last modified by	waj (4416)
Numerical id	7
Author	waj (4416)
Entry type	Proof
Classification	msc 54D10
Related topic	ASpaceIsT1IfAndOnlyIfEverySubsetAIsTheIntersectionOfAllOpenSetsContainingA