Alexandrov one-point compactification

The Alexandrov one-point compactification of a non-compact topological space $X$ is obtained by adjoining a new point $\mathrm{\infty }$ and defining the topology on $X\cup \{\mathrm{\infty }\}$ to consist of the open sets of $X$ together with the sets of the form $U\cup \{\mathrm{\infty }\}$, where $U$ is an open subset of $X$ with compact complement.

With this topology, $X\cup \{\mathrm{\infty }\}$ is always compact.Furthermore, it is Hausdorff if and only if $X$ is Hausdorff and locally compact.