Relation Induced by Strict Positivity Property is Compatible with Addition/Corollary

Theorem
Let $\left({D, +, \times}\right)$ be an ordered integral domain where $P$ is the positivity property. Let $\le$ be the relation defined on $D$ as:
 * $\le \ := \ < \cup \Delta_D$

where $\Delta_D$ is the diagonal relation.

Then $\le$ is compatible with $+$.

Proof
Let $a \le b$.

If $a \ne b$ then:
 * $a < b$

and Relation Induced by Positivity Property is Compatible with Addition applies.

Otherwise $a = b$.

But $\left({D, +}\right)$ is the additive group of $\left({D, +, \times}\right)$ and the Cancellation Laws apply:
 * $a + c = b + c \iff a = b \iff c + a = c + b$

So $\le$ is seen to be compatible with $+$.