Membership Relation is Not Reflexive

Theorem
Let $\Bbb S$ be a set of sets in the context of pure set theory

Let $\RR$ denote the membership relation on $\Bbb S$:
 * $\forall \tuple {a, b} \in \Bbb S \times \Bbb S: \tuple {a, b} \in \RR \iff a \in b$

$\RR$ is not in general a reflexive relation.

Proof
In the extreme pathological edge case:
 * $S = \set S$

it is seen that:
 * $S \in S$

and so:
 * $\forall x \in S: x \in x$

demonstrating that $\RR$ is reflexive in this specific case.

However, in this case $\set S$ is a set on which the Axiom of Foundation does not apply.

This is seen in Set is Not Element of Itself.

Hence this set is not supported by Zermelo-Fraenkel set theory.

Consider the set:


 * $T = \set {\O, \set \O}$

Then we immediately see that:
 * $\O \notin \O$

and so $\RR$ is seen to be not reflexive.