Inverse Completion is Unique

Theorem
An inverse completion of a commutative semigroup is unique up to isomorphism.

Proof
Let $T$ and $T'$ both be inverse completions of a commutative semigroup $S$ having cancellable elements.

Then from the Extension Theorem for Isomorphisms, there is a unique isomorphism $\phi: T \to T'$ satisfying $\forall x \in S: \phi \left({x}\right) = x$.

Hence the result.

Comment
Thus, when discussing inverse completions of a commutative semigroup with cancellable elements, we can talk about the inverse completion of such a semigroup.