Diagonal Relation is Smallest Equivalence Relation

Theorem
The diagonal relation $\Delta_S$ on $S$ is the smallest equivalence in $S$, in the sense that:


 * $\forall \mathcal E \subseteq S \times S: \Delta_S \subseteq \mathcal E$

where $\mathcal E$ denotes a general equivalence relation.

Proof
It is confirmed that, from Diagonal Relation is Equivalence, $\Delta_S$ is an equivalence relation.

Let $\mathcal E$ be an arbitrary equivalence relation.

By definition, $\mathcal E$ is reflexive.

From Relation Contains Diagonal Relation iff Reflexive it follows that as $\Delta_S \subseteq \mathcal E$.