Sequence of Implications of Metric Space Compactness Properties

Theorem
Let $P_1$ and $P_2$ be compactness properties and let:
 * $P_1 \implies P_2$

mean:
 * If a metric space $M$ satsifies property $P_1$, then $M$ also satisfies property $P_2$.

Then the following sequence of implications holds:

Proof
The relevant justifications are listed as follows:


 * Metric Space is Compact iff Countably Compact.
 * Metric Space is Countably Compact iff Sequentially Compact.
 * Metric Space is Weakly Countably Compact iff Countably Compact.


 * Compact Space is $\sigma$-Locally Compact.


 * By definition, a $\sigma$-locally compact space is both locally compact and $\sigma$-compact.


 * $\sigma$-Compact Space is Lindelöf.
 * Metric Space is Lindelöf iff Second-Countable.
 * Metric Space is Separable iff Second-Countable.


 * Metric Space is Locally Compact iff Strongly Locally Compact.