Definition:Image (Relation Theory)/Mapping/Subset

Definition
Let $f: S \to T$ be a mapping. Let $X \subseteq S$.

Then the image (or image set) of $X$ (by $f$) is defined as:
 * $\operatorname {Im} \left ({X}\right) := \left\{ {t \in T: \exists s \in X: f \left({s}\right) = t}\right\}$

It is also clear that:
 * $\forall s \in S: \operatorname{Im} \left ({\left\{{s}\right\}}\right) = \left\{{ f \left ({s}\right) }\right\}$

where $f \left ({s}\right)$ is the image of $s$.

If $X = \operatorname{Dom} \left({f}\right)$, we have:


 * $\operatorname{Im} \left ({\operatorname{Dom} \left({f}\right)}\right) = \operatorname{Im} \left ({f}\right)$

where $\operatorname{Im} \left ({f}\right)$ is the image (set) of $f$.

Also denoted as
$\operatorname {Im} \left ({X}\right)$ is frequently rendered as $f \left [{X}\right]$, which can be argued as preferable in some situations, as this makes it more apparent to exactly what mapping the image refers.

Also known as
Some authors prefer not to use the notation $f \left [{X}\right]$ and instead use the concept of the mapping induced from the power set of $S$ to the power set of $T$.

For example, uses $f^\to \left ({X}\right)$ for $f \left[{X}\right]$

Some authors stipulate the name further by calling $\operatorname {Im} \left ({X}\right)$ the direct image of $X$ (by $f$).

This is done to emphasize the distinction between this and the concept of the inverse image.