mh-inf3sn

Description: Version of inf3 for the set of Zermelo ordinals (/) , { (/) } , { { (/) } } , { { { (/) } } } , etc., where the successor of y is { y } . Unlike inf3 , the proof does not require ax-reg , since the singleton properties snnz and sneqr are sufficient to guarantee that all elements of the sequence are distinct. (Contributed by Matthew House, 13-Apr-2026)

		Ref	Expression
	Hypothesis	mh-inf3sn.1	$⊢ \exists x (\emptyset \in x \land \forall y \in x \{y\} \in x)$
	Assertion	mh-inf3sn	$⊢ ω \in V$

Proof

Step	Hyp	Ref	Expression
1		mh-inf3sn.1	$⊢ \exists x (\emptyset \in x \land \forall y \in x \{y\} \in x)$
2		simpr	$⊢ (\emptyset \in x \land \forall y \in x \{y\} \in x) \to \forall y \in x \{y\} \in x$
3		vex	$⊢ y \in V$
4	3	sneqr	$⊢ \{y\} = \{z\} \to y = z$
5	4	rgen2w	$⊢ \forall y \in x \forall z \in x (\{y\} = \{z\} \to y = z)$
6		eqid	$⊢ (y \in x ⟼ \{y\}) = (y \in x ⟼ \{y\})$
7		sneq	$⊢ y = z \to \{y\} = \{z\}$
8	6 7	f1mpt	$⊢ (y \in x ⟼ \{y\}) : x \underset{1-1}{⟶} x \leftrightarrow (\forall y \in x \{y\} \in x \land \forall y \in x \forall z \in x (\{y\} = \{z\} \to y = z))$
9	2 5 8	sylanblrc	$⊢ (\emptyset \in x \land \forall y \in x \{y\} \in x) \to (y \in x ⟼ \{y\}) : x \underset{1-1}{⟶} x$
10		simpl	$⊢ (\emptyset \in x \land \forall y \in x \{y\} \in x) \to \emptyset \in x$
11		snnzg	$⊢ y \in x \to \{y\} \neq \emptyset$
12	11	necomd	$⊢ y \in x \to \emptyset \neq \{y\}$
13	12	neneqd	$⊢ y \in x \to \neg \emptyset = \{y\}$
14	13	nrex	$⊢ \neg \exists y \in x \emptyset = \{y\}$
15		vsnex	$⊢ \{y\} \in V$
16	6 15	elrnmpti	$⊢ \emptyset \in ran (y \in x ⟼ \{y\}) \leftrightarrow \exists y \in x \emptyset = \{y\}$
17	14 16	mtbir	$⊢ \neg \emptyset \in ran (y \in x ⟼ \{y\})$
18	17	a1i	$⊢ (\emptyset \in x \land \forall y \in x \{y\} \in x) \to \neg \emptyset \in ran (y \in x ⟼ \{y\})$
19	10 18	eldifd	$⊢ (\emptyset \in x \land \forall y \in x \{y\} \in x) \to \emptyset \in (x ∖ ran (y \in x ⟼ \{y\}))$
20	9 19	mh-inf3f1	$⊢ (\emptyset \in x \land \forall y \in x \{y\} \in x) \to ({rec ((y \in x ⟼ \{y\}), \emptyset) ↾}_{ω}) : ω \underset{1-1}{⟶} x$
21		vex	$⊢ x \in V$
22		f1dmex	$⊢ (({rec ((y \in x ⟼ \{y\}), \emptyset) ↾}_{ω}) : ω \underset{1-1}{⟶} x \land x \in V) \to ω \in V$
23	20 21 22	sylancl	$⊢ (\emptyset \in x \land \forall y \in x \{y\} \in x) \to ω \in V$
24	23 1	exlimiiv	$⊢ ω \in V$

Metamath Proof Explorer

Theorem mh-inf3sn

Proof