Definition:Proper Subset/Improper

Definition
Let $T$ be a set. $S$ is an improper subset of $T$ $S$ is a subset of $T$ but specifically not a proper subset of $T$.

That is, either:
 * $S = T$

or:
 * $S = \O$

Also defined as
Some sources categorise the empty set $\O$ as a proper subset, and not an improper subset.

As this is merely a matter of nomenclature, this distinction should not be of great importance.

However, it is wise to make sure which usage is intended when it is encountered.