Existence of Weakly Sigma-Locally Compact Space which is not Strongly Locally Compact

Theorem
There exists at least one example of a weakly $\sigma$-locally compact topological space which is not also a strongly locally compact space.

Proof
Let $T$ be the nested interval topological space.

From Nested Interval Topology is Weakly $\sigma$-Locally Compact, $T$ is a weakly $\sigma$-locally compact space.

From Nested Interval Topology is not Strongly Locally Compact, $T$ is not a strongly locally compact space.

Hence the result.