Metamath Proof Explorer

Theorem onminesb

Description: If a property is true for some ordinal number, it is true for a minimal ordinal number. This version uses explicit substitution. Theorem Schema 62 of Suppes p. 228. (Contributed by NM, 29-Sep-2003)

		Ref	Expression
	Assertion	onminesb	$⊢ \exists x \in On φ \to \underset{˙}{[} ⋂ \{x \in On \| φ\} / x \underset{˙}{]} φ$

Proof

Step	Hyp	Ref	Expression
1		rabn0	$⊢ \{x \in On \| φ\} \neq \emptyset \leftrightarrow \exists x \in On φ$
2		ssrab2	$⊢ \{x \in On \| φ\} \subseteq On$
3		onint	$⊢ (\{x \in On \| φ\} \subseteq On \land \{x \in On \| φ\} \neq \emptyset) \to ⋂ \{x \in On \| φ\} \in \{x \in On \| φ\}$
4	2 3	mpan	$⊢ \{x \in On \| φ\} \neq \emptyset \to ⋂ \{x \in On \| φ\} \in \{x \in On \| φ\}$
5	1 4	sylbir	$⊢ \exists x \in On φ \to ⋂ \{x \in On \| φ\} \in \{x \in On \| φ\}$
6		nfcv	$⊢ \underline{Ⅎ} x On$
7	6	elrabsf	$⊢ ⋂ \{x \in On \| φ\} \in \{x \in On \| φ\} \leftrightarrow (⋂ \{x \in On \| φ\} \in On \land \underset{˙}{[} ⋂ \{x \in On \| φ\} / x \underset{˙}{]} φ)$
8	7	simprbi	$⊢ ⋂ \{x \in On \| φ\} \in \{x \in On \| φ\} \to \underset{˙}{[} ⋂ \{x \in On \| φ\} / x \underset{˙}{]} φ$
9	5 8	syl	$⊢ \exists x \in On φ \to \underset{˙}{[} ⋂ \{x \in On \| φ\} / x \underset{˙}{]} φ$