Condition for Composite Relation with Inverse to be Identity

Theorem
Let $\RR \subseteq S \times T$ be a relation on $S \times T$.

Let $\RR \circ \RR^{-1}$ be the composite of $\RR$ with its inverse.

Let $I_T$ be the identity mapping on $T$.

Then:
 * $\RR \circ \RR^{-1} = I_T$


 * $\RR$ is many-to-one
 * $\RR$ is many-to-one

and:
 * $\RR$ is right-total.

Example

 * CompositeWithInverseIdentity.png

Note in the above that:


 * $\RR$ is many-to-one
 * $\RR$ is right-total
 * $\RR \circ \RR^{-1} = I_T$.

Note, however, that $\RR^{-1}$ is neither many-to-one nor right-total, and does not need to be for $\RR \circ \RR^{-1} = I_T$.

Sufficient Condition
Let $\RR \circ \RR^{-1} = I_T$.


 * $\exists t \in T: t \notin \Img \RR$
 * $\exists t \in T: t \notin \Img \RR$

Then:
 * $t \notin \Img {\RR \circ \RR^{-1} }$

But:
 * $t \in \Img {I_T}$

by definition of the identity mapping on $T$.

Hence:
 * $\RR \circ \RR^{-1} \ne I_T$

From this contradiction we deduce that:
 * $\RR \circ \RR^{-1} = I_T \implies T \setminus \Img \RR = \O$

where $T \setminus \Img \RR$ denotes set difference.

So from Set Difference with Superset is Empty Set‎:
 * $T \subseteq \Img \RR$

But from Image is Subset of Codomain we have:
 * $T \supseteq \Img \RR$

and so:
 * $\Img \RR = T$

which means $\RR$ is right-total.

Suppose $\RR$ is not many-to-one.

Then:
 * $\exists s \in S: \exists t_1, t_2 \in T, t_1 \ne t_2: \tuple {s, t_1} \in \RR \land \tuple {s, t_2} \in \RR$

By definition of inverse relation:
 * $\exists s \in S: \exists t_1, t_2 \in T: \tuple {t_1, s} \in \RR^{-1} \land \tuple {t_2, s} \in \RR^{-1}$

The composite of $\RR^{-1}$ and $\RR$ is defined as:


 * $\RR \circ \RR^{-1} = \set {\tuple {x, z} \in T \times T: \exists y \in S: \tuple {x, y} \in \RR^{-1} \land \tuple {y, z} \in \RR}$

Thus:

So, by definition of identity mapping:
 * $\RR \circ \RR^{-1} \ne I_T$

From this contradiction we deduce that $\RR$ must be many-to-one.

So it has been demonstrated that if:
 * $\RR \circ \RR^{-1} = I_T$

then:
 * $\RR$ is many-to-one

and
 * $\RR$ is right-total.

Necessary Condition
Let:
 * $\RR$ be many-to-one

and
 * $\RR$ be right-total.

Let $\tuple {t_1, t_2} \in \RR \circ \RR^{-1}$.

The composite of $\RR^{-1}$ and $\RR$ is defined as:


 * $\RR \circ \RR^{-1} = \set {\tuple {t_1, t_2} \in T \times T: \exists s \in S: \tuple {t_1, s} \in \RR^{-1} \land \tuple {s, t_2} \in \RR}$

By definition of inverse:
 * $\RR \circ \RR^{-1} = \set {\tuple {t_1, t_2} \in T \times T: \exists s \in S: \tuple {s, t_1} \in \RR \land \tuple {s, t_2} \in \RR}$

But $\RR$ is many-to-one, and so:
 * $t_1 = t_2$

So:
 * $\forall \tuple {t_1, t_2} \in \RR \circ \RR^{-1}: t_1 = t_2$

and so:
 * $\RR \circ \RR^{-1} \subseteq I_T$

Now let $t \in T$.

By definition of identity mapping on $T$:
 * $\tuple {t, t} \in I_T$

As $\RR$ is right-total:
 * $\Img \RR = T$

and so:
 * $\exists s \in S: \tuple {s, t} \in \RR$

and so:
 * $\exists s \in S: \tuple {t, s} \in \RR^{-1}$

Hence by definition of the composite of $\RR^{-1}$ and $\RR$:
 * $\tuple {t, t} \in \RR \circ \RR^{-1}$

So:
 * $\RR \circ \RR^{-1} \supseteq I_T$

and so:
 * $\RR \circ \RR^{-1} = I_T$

Hence the result.