first countable implies compactly generated

Proposition 1.

Any first countable topological space is compactly generated.

Proof.

Suppose $X$ is first countable, and $A\subseteq X$ has the property that, if $C$ is any compact set in $X$ , the set $A\cap C$ is closed in $C$ . We want to show tht $A$ is closed in $X$ . Since $X$ is first countable, this is equivalent to showing that any sequence $(x_{i})$ in $A$ converging to $x$ implies that $x\in A$ . Let $C=\{x_{i}\mid i=1,2,\ldots\}\cup\{x\}$ .

Lemma 1.

$C$ is compact.

Proof.

Let $\{U_{j}\mid j\in J\}$ be a collection of open sets covering $C$ . So $x\in U_{j}$ for some $j$ . Since $U_{j}$ is open, there is a positive integer $k$ such that $x_{i}\in U_{j}$ for all $i\geq k$ . Now, each $x_{i}\in U_{d(i)}$ for $i=1,\ldots,k$ . So $C$ is covered by $U_{d(1)},\ldots,U_{d(k)}$ , and $U_{j}$ , showing that $C$ is compact. ∎

In addition, as a subspace of $X$ , $C$ is also first countable. By assumption, $A\cap C$ is closed in $C$ . Since $x_{i}\in A\cap C$ for all $i\geq 1$ , we see that $x\in A\cap C$ as well, since $C$ is first countable. Hence $x\in A$ , and $A$ is closed in $X$ . ∎

Title	first countable implies compactly generated
Canonical name	FirstCountableImpliesCompactlyGenerated
Date of creation	2013-03-22 19:09:35
Last modified on	2013-03-22 19:09:35
Owner	CWoo (3771)
Last modified by	CWoo (3771)
Numerical id	4
Author	CWoo (3771)
Entry type	Example
Classification	msc 54E99