Interior Equals Closure of Subset of Discrete Space

Theorem
Let $T = \struct {S, \tau}$ be a discrete topological space. Let $A \subseteq S$.

Then:
 * $A = A^\circ = A^-$

where:
 * $A^\circ$ is the interior of $A$
 * $A^-$ is the closure of $A$.

Proof
Let $A \subseteq S$.

Then from Set in Discrete Topology is Clopen it follows that $A$ is both open and closed in $T$.

From Closed Set Equals its Closure we have that $A = A^-$.

From Set Interior is Largest Open Set, we have that $A^\circ = A$.