Subset equals Image of Preimage iff Mapping is Surjection

Theorem
Let $f: S \to T$ be a mapping.

Let $f^\to: \powerset S \to \powerset T$ be the mapping induced by $f$.

Similarly, let $f^\gets: \powerset T \to \powerset S$ be the mapping induced by the inverse $f^{-1}$.

Then:
 * $\forall B \in \powerset T: B = \map {\paren {f^\to \circ f^\gets} } B$

$f$ is a surjection.

Sufficient Condition
Let $f$ be such that:
 * $\forall B \in \powerset T: B = \map {\paren {f^\to \circ f^\gets} } B$

From Subset equals Image of Preimage implies Surjection, $f$ is a surjection.

Necessary Condition
Let $f$ be a surjection.

Then by Image of Preimage of Subset under Surjection equals Subset:


 * $B = \map {f^\to} {\map {f^\gets} B}$