$\mathcal{A}, X_{\infty}$'un $\tau_{\infty}$-açık örtüsü yani $\mathcal{A}\subseteq \tau_{\infty}$ ve $X_{\infty}=\cup\mathcal{A}$ olsun.
$(\mathcal{A}\subseteq \tau_{\infty})(X_{\infty}=\cup\mathcal{A})\Rightarrow (\exists A\in\mathcal{A})(\infty\in A)$
$\left.\begin{array}{rr} \Rightarrow (\exists B\subseteq X)(B, \tau\text{-kapalı})(B, \tau\text{-kompakt})(A=X_{\infty}\setminus B) \\ \\ \mathcal{B}^*:=\{X\cap A|A\in\mathcal{A}\}\Rightarrow B\subseteq \cup \mathcal{B}^*\end{array}\right\}\Rightarrow $
$\left.\begin{array}{rr} \Rightarrow (\exists \mathcal{B}\subseteq \mathcal{B}^*)(|\mathcal{B}|<\aleph_0)(B\subseteq\cup\mathcal{B}) \\ \\ \mathcal{A}^*:=\{\setminus B\}\cup\{A|X\cap A\in\mathcal{B}^*\}\end{array}\right\}\Rightarrow (\mathcal{A}^*\subseteq\mathcal{A})(|\mathcal{A}^*|<\aleph_0)(X_{\infty}=\cup\mathcal{A}^*).$