Neighborhood of Origin of Arens-Fort Space is Closed

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

Every neighborhood of $\left({0, 0}\right)$ is closed in $T$.

Proof
Let $H \subseteq T$ such that:
 * $\exists U \in \tau: \left({0, 0}\right) \in U \subseteq H \subseteq S$

i.e. such that $H$ is a neighborhood of $\left({0, 0}\right)$ in $T$.

As $\left({0, 0}\right) \in H$ it follows that $\left({0, 0}\right) \notin \complement_S \left({H}\right)$.

So, by definition of the Arens-Fort space, $\complement_S \left({H}\right)$ is open in $T$.

So by definition, we have that $H$ is closed.