Metamath Proof Explorer

Theorem bnd

Description: A very strong generalization of the Axiom of Replacement (compare zfrep6 ), derived from the Collection Principle cp . Its strength lies in the rather profound fact that ph ( x , y ) does not have to be a "function-like" wff, as it does in the standard Axiom of Replacement. This theorem is sometimes called the Boundedness Axiom. (Contributed by NM, 17-Oct-2004)

		Ref	Expression
	Assertion	bnd	$⊢ \forall x \in z \exists y φ \to \exists w \forall x \in z \exists y \in w φ$

Proof

Step	Hyp	Ref	Expression
1		cp	$⊢ \exists w \forall x \in z (\exists y φ \to \exists y \in w φ)$
2		ralim	$⊢ \forall x \in z (\exists y φ \to \exists y \in w φ) \to (\forall x \in z \exists y φ \to \forall x \in z \exists y \in w φ)$
3	1 2	eximii	$⊢ \exists w (\forall x \in z \exists y φ \to \forall x \in z \exists y \in w φ)$
4	3	19.37iv	$⊢ \forall x \in z \exists y φ \to \exists w \forall x \in z \exists y \in w φ$