Locally Compact
# Definition
Let $X$ be a Topological Space. Then $X$ is Locally Compact if for all $x \in X$, there exists aneighborhood of $x$ that is a subset of a Compact Set.
Search
Let $X$ be a Topological Space. Then $X$ is Locally Compact if for all $x \in X$, there exists aneighborhood of $x$ that is a subset of a Compact Set.