Arens-Fort Space is not Connected

Theorem
Let $T = \left({S, \tau}\right)$ be the Arens-Fort space.

Then $T$ is not a connected space.

Proof
Consider $p \in S$ such that $p \ne \left({0, 0}\right)$.

From Clopen Points in Arens-Fort Space, we have that $\left\{{p}\right\}$ is both open and closed set in $T$.

So by definition of closed set,$\complement_S \left({\left\{{p}\right\}}\right)$ is also both open and closed set in $T$.

So, by definition, $\left\{{p}\right\} \mid \complement_S \left({\left\{{p}\right\}}\right)$ is a partition of $T$

Hence the result, by definition of connected space.