Set System Closed under Symmetric Difference is Abelian Group

Theorem
Let $\mathcal S$ be a system of sets.

Let $\mathcal S$ be such that:
 * $\forall A, B \in \mathcal S: A * B \in \mathcal S$

where $A * B$ denotes the symmetric difference between $A$ and $B$.

Then $\left({\mathcal S, *}\right)$ is an abelian group.

G0: Closure
By definition (above), $\left({\mathcal S, *}\right)$ is closed.

G1: Associativity

 * $\forall A, B, C \in \mathcal S: \left({A * B}\right) * C = A * \left({B * C}\right)$ as Symmetric Difference is Associative.

G2: Identity
From Symmetric Difference Self Null, we have that:
 * $\forall A \in \mathcal S: A * A = \varnothing$

So it is clear that $\varnothing$ is in $\mathcal S$, from the fact that $\left({\mathcal S, *}\right)$ is Closed.

Then we have:


 * $\forall A \in \mathcal S: A * \varnothing = A = \varnothing * A$ from Symmetric Difference with Null and Symmetric Difference is Commutative.

Thus $\varnothing$ acts as an identity.

G3: Inverses
From the above, we know that $\varnothing$ is the identity element of $\left({\mathcal S, *}\right)$.

We also noted that
 * $\forall A \in \mathcal S: A * A = \varnothing$

From Symmetric Difference Self Null.

Thus each $A \in \mathcal S$ is self-inverse.

Commutativity

 * $\forall A, B \in \mathcal S: A * B = B * A$ as Symmetric Difference is Commutative.

We see that $\left({\mathcal S, *}\right)$ is closed, associative, commutative, has an identity $\varnothing$, and each element has an inverse (itself), so it satisfies the criteria for being an abelian group.