Closed Set in Particular Point Space has no Limit Points

Theorem
Let $T = \left({S, \tau_p}\right)$ be a particular point space.

Let $H \subseteq S$ be closed in $T$.

Then $H$ has no limit points.

Proof
Let $H$ be closed in $T$.

Then by definition $p \notin H$.

Let $x \in H$.

By definition, $x$ is a limit point of $H$ if every open set $U \in \tau$ such that $x \in U$ contains some point of $H$ other than $x$.

Consider the set $U_x := \left\{{x, p}\right\} \subseteq S$.

As $p \in U_x$ we have that $U_x$ is open in $T$.

But there is no $y \in U_x: y \in H, y \ne x$ and so $x$ is not a limit point of $H$.

So $H$ has no limit points.