neipeltop

		Ref	Expression
	Hypothesis	neiptop.o	$⊢ J = \{a \in 𝒫 X \| \forall p \in a a \in N (p)\}$
	Assertion	neipeltop	$⊢ C \in J \leftrightarrow (C \subseteq X \land \forall p \in C C \in N (p))$

Step	Hyp	Ref	Expression
1		neiptop.o	$⊢ J = \{a \in 𝒫 X \| \forall p \in a a \in N (p)\}$
2		eleq1	$⊢ a = C \to (a \in N (p) \leftrightarrow C \in N (p))$
3	2	raleqbi1dv	$⊢ a = C \to (\forall p \in a a \in N (p) \leftrightarrow \forall p \in C C \in N (p))$
4	3 1	elrab2	$⊢ C \in J \leftrightarrow (C \in 𝒫 X \land \forall p \in C C \in N (p))$
5		0ex	$⊢ \emptyset \in V$
6		eleq1	$⊢ C = \emptyset \to (C \in V \leftrightarrow \emptyset \in V)$
7	5 6	mpbiri	$⊢ C = \emptyset \to C \in V$
8	7	adantl	$⊢ (\forall p \in C C \in N (p) \land C = \emptyset) \to C \in V$
9		elex	$⊢ C \in N (p) \to C \in V$
10	9	ralimi	$⊢ \forall p \in C C \in N (p) \to \forall p \in C C \in V$
11		r19.3rzv	$⊢ C \neq \emptyset \to (C \in V \leftrightarrow \forall p \in C C \in V)$
12	11	biimparc	$⊢ (\forall p \in C C \in V \land C \neq \emptyset) \to C \in V$
13	10 12	sylan	$⊢ (\forall p \in C C \in N (p) \land C \neq \emptyset) \to C \in V$
14	8 13	pm2.61dane	$⊢ \forall p \in C C \in N (p) \to C \in V$
15		elpwg	$⊢ C \in V \to (C \in 𝒫 X \leftrightarrow C \subseteq X)$
16	14 15	syl	$⊢ \forall p \in C C \in N (p) \to (C \in 𝒫 X \leftrightarrow C \subseteq X)$
17	16	pm5.32ri	$⊢ (C \in 𝒫 X \land \forall p \in C C \in N (p)) \leftrightarrow (C \subseteq X \land \forall p \in C C \in N (p))$
18	4 17	bitri	$⊢ C \in J \leftrightarrow (C \subseteq X \land \forall p \in C C \in N (p))$

Metamath Proof Explorer