Arens–Fort space

In mathematics, the Arens–Fort space is a special example in the theory of topological spaces, named for Richard Friederich Arens and M. K. Fort, Jr.

Definition

The Arens–Fort space is the topological space $(X,\tau )$ where $X$ is the set of ordered pairs of non-negative integers $(m,n).$ A subset $U\subseteq X$ is open, that is, belongs to $\tau ,$ if and only if:

$U$ does not contain $(0,0),$ or
$U$ contains $(0,0)$ and also all but a finite number of points of all but a finite number of columns, where a column is a set $\{(m,n)~:~0\leq n\in \mathbb {Z} \}$ with $0\leq m\in \mathbb {Z}$ fixed.

In other words, an open set is only "allowed" to contain $(0,0)$ if only a finite number of its columns contain significant gaps, where a gap in a column is significant if it omits an infinite number of points.

Properties

It is

It is not:

There is no sequence in $X\setminus \{(0,0)\}$ that converges to $(0,0).$ However, there is a sequence $x_{\bullet }=\left(x_{i}\right)_{i=1}^{\infty }$ in $X\setminus \{(0,0)\}$ such that $(0,0)$ is a cluster point of $x_{\bullet }.$