Irrational Number Space is not Locally Compact Hausdorff Space

Theorem
Let $\struct {\R \setminus \Q, \tau_d}$ be the irrational number space under the Euclidean topology $\tau_d$.

Then $\struct {\R \setminus \Q, \tau_d}$ is not a locally compact Hausdorff Space.

Proof
For $\struct {\R \setminus \Q, \tau_d}$ to be a locally compact Hausdorff Space, it is required that every point of $\R \setminus \Q$ has a compact neighborhood.

Let $x \in \R \setminus \Q$.

Let $N \subseteq \R \setminus \Q$ be a neighborhood of $x$.

Then:


 * $\exists U \in \tau: x \in U \subseteq N \subseteq \R \setminus \Q$.

$N$ is compact.

By Compact Set of Irrational Numbers is Nowhere Dense, $N$ is nowhere dense.

Thus $N^-$ contains no open set of $\R \setminus \Q$ which is non-empty.

But $U$ is a non-empty open set of $\R \setminus \Q$.

By Set is Subset of its Topological Closure, $N \subseteq N^-$.

Because Subset Relation is Transitive:


 * $U \subseteq N^-$

This is a contradiction.

Hence $\struct {\R \setminus \Q, \tau_d}$ is not a locally compact Hausdorff Space.

Also see

 * Rational Number Space is not Locally Compact Hausdorff Space