Closure of Intersection may not equal Intersection of Closures

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

Let $H_1$ and $H_2$ be subsets of $S$.

Let ${H_1}^-$ and ${H_2}^-$ denote the closures of $H_1$ and $H_2$ respectively.

Then it is not necessarily the case that:
 * $\paren {H_1 \cap H_2}^- = {H_1}^- \cap {H_2}^-$

Proof
Note that from Closure of Intersection is Subset of Intersection of Closures it is always the case that:
 * $\paren {H_1 \cap H_2}^- \subseteq {H_1}^- \cap {H_2}^-$

It remains to be shown that it does not always happen that:
 * $\paren {H_1 \cap H_2}^- = {H_1}^- \cap {H_2}^-$

Proof by Counterexample:

Let $\struct {\R, \tau_d}$ be the real number line under the usual (Euclidean) topology.

Let $H_1 = \openint 0 {\dfrac 1 2}$ and $H_2 = \openint {\dfrac 1 2} 1$.

By inspection it can be seen that:
 * $H_1 \cap H_2 = \O$

Thus from Closure of Empty Set is Empty Set:
 * $\paren {H_1 \cap H_2}^- = \O$

From Closure of Open Real Interval is Closed Real Interval:
 * $H_1 = \closedint 0 {\dfrac 1 2}, H_2 = \closedint {\dfrac 1 2} 1$

Thus:
 * ${H_1}^- \cap {H_2}^- = \set {\dfrac 1 2}$

So $\paren {H_1 \cap H_2}^- \ne {H_1}^- \cap {H_2}^-$

Hence the result.