Trivial Topological Space is Irreducible
Theorem
Let $T = \struct {\set s, \tau}$ be a trivial topological space.
Then $T$ is irreducible.
Proof
Follows from:
$\blacksquare$
Let $T = \struct {\set s, \tau}$ be a trivial topological space.
Then $T$ is irreducible.
Follows from:
$\blacksquare$