Well-Founded Induction

Theorem
Let $\struct {A, \RR}$ be a strictly well-founded relation.

Let $\RR^{-1} \sqbrk x$ denote the preimage of $x$ for each $x \in A$.

Let $B$ be a class such that $B \subseteq A$.

Suppose that:
 * $(1): \quad \forall x \in A: \paren {\RR^{-1} \sqbrk x \subseteq B \implies x \in B}$

Then:


 * $A = B$

That is, if a property passes from the preimage of $x$ to $x$, then this property is true for all $x \in A$.

Proof
$A \nsubseteq B$.

Then:
 * $A \setminus B \ne 0$

By Strictly Well-Founded Relation determines Strictly Minimal Elements, $A \setminus B$ must have some strictly minimal element under $\RR$.

Let $\map \complement B$ be the set complement of $B$.

Then:

So, by Intersection with Complement is Empty iff Subset:
 * $A \cap \RR^{-1} \sqbrk x \subseteq B$

Since $\RR^{-1} \sqbrk x \subseteq A$, by definition of a subset:
 * $\RR^{-1} \sqbrk x \subseteq B$

Thus, $(1)$:
 * $x \in B$

But this contradicts the fact that:
 * $x \in A \setminus B$

By Proof by Contradiction it follows that:
 * $A \setminus B = \O$

and so:
 * $A \subseteq B$

Therefore:
 * $A = B$

Also see
Well-Ordered Induction, a weaker theorem that does not require the Axiom of Foundation.