Definition:Right Inverse Mapping

Definition
Let $S, T$ be sets where $S \ne \varnothing$, i.e. $S$ is not empty.

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

Let $g: T \to S$ be a mapping such that:
 * $f \circ g = I_T$

where:
 * $f \circ g$ denotes the composite mapping $g$ followed by $f$;
 * $I_T$ is the identity mapping on $T$.

Then $g: T \to S$ is called a right inverse (mapping) of $f$.

Also see

 * Surjection iff Right Inverse, which demonstrates that $g$ can not be defined unless $f$ is a surjection.


 * Left Inverse Mapping

In the context of abstract algebra: from which it can be seen that a left inverse mapping can be considered as a left inverse element of an algebraic structure whose operation is composition of mappings.
 * Left inverse element
 * Right inverse element