Division Theorem for Ordinals

Theorem
Let $x$ and $y$ be ordinals.

Let $0$ denote the zero ordinal.

Suppose $y \ne 0$.

Then there exist unique ordinals $z$ and $w$ such that:


 * $x = \left({ y \times z }\right) + w$ and $w < y$.

Existence of $z$ and $w$
First, it must be proven that such $z$ and $w$ exist.

By Relation between Two Ordinals, it follows that:


 * $x < y$ or $y \le x$

The proof shall proceed by cases.

Case 1
If $x < y$, then set $z = 0$ and $w = x$.

Case 2
If $y \le x$, then set $z = \bigcup \left\{ v : \left({ y \times v }\right) \le x \right\}$.

Set $w$ equal to the unique $u$ such that $\left({ y \times z }\right) + u = x$.

By Ordinal Multiplication by One, it follows that $1 \le z$.

By Union of Ordinals is Least Upper Bound, it follows that $z$ is the least upper bound of $\left\{ v : \left({ y \times v }\right) \le x \right\}$.

Take any $u \in z$.

Then $u \in v$ for some $\left({ y \times v }\right) \le x$

But then, by Membership Left Compatible with Ordinal Multiplication, it follows that $\left({ y \times u }\right) \le x$.

So $z$ is a transitive subset of $\operatorname{On}$ and therefore, it is an ordinal.

Since $z \ne 0$, then by the definition of limit ordinal, then $z = u^+$ for some $u$ or $z$ is a limit ordinal.

Suppose $z = u^+$.

Then $u < z$ and $y \times u \le x$.

Moreover, $u < v$ for some $y \times v \le x$.

This means that $v \not < z$ by No Ordinal Between Set and Successor.

By Ordinal Membership Trichotomy, $z \le v$.

Therefore, $y \times z \le x$

Suppose $z \in K_{II}$.

Note that $\forall u \in z: y \times u \le x$ so:

In either case, $y \times z \le x$.

Moreover, suppose that $y \times z^+ \le x$.

Then $z$ is not an upper bound of the set $\left\{ v : \left({ y \times v }\right) \le x \right\}$, which is a contradiction.

So $\left({ y \times z }\right) + w = x$ for some $w \in y$ by Ordinal Subtraction when Possible is Unique.

Uniqueness of $z$ and $w$
Suppose that $\left({ y \times z_1 }\right) + w_1 = x$ for some $w_1 \in y$.

Suppose that $\left({ y \times z_2 }\right) + w_2 = x$ for some $w_2 \in y$.

Then for both $z = z_1$ and $z = z_2$, the following inequality is established:

It follows that $y \times z_1 < y \times z_2^+$ and $y \times z_2 < y \times z_1^+$.

By Membership Left Compatible with Ordinal Multiplication, $z_1 < z_2^+$ and $z_2 < z_1^+$.

Therefore, $z$ is unique.

Since $z$ is unique, then $w$ is unique by Ordinal Subtraction when Possible is Unique.