elrfirn2

Description: Elementhood in a set of relative finite intersections of an indexed family of sets (implicit). (Contributed by Stefan O'Rear, 22-Feb-2015)

		Ref	Expression
	Assertion	elrfirn2	$⊢ (B \in V \land \forall y \in I C \subseteq B) \to (A \in fi (\{B\} \cup ran (y \in I ⟼ C)) \leftrightarrow \exists v \in (𝒫 I \cap Fin) A = B \cap ⋂_{y \in v} C)$

Proof

Step	Hyp	Ref	Expression
1		elpw2g	$⊢ B \in V \to (C \in 𝒫 B \leftrightarrow C \subseteq B)$
2	1	biimprd	$⊢ B \in V \to (C \subseteq B \to C \in 𝒫 B)$
3	2	ralimdv	$⊢ B \in V \to (\forall y \in I C \subseteq B \to \forall y \in I C \in 𝒫 B)$
4	3	imp	$⊢ (B \in V \land \forall y \in I C \subseteq B) \to \forall y \in I C \in 𝒫 B$
5		eqid	$⊢ (y \in I ⟼ C) = (y \in I ⟼ C)$
6	5	fmpt	$⊢ \forall y \in I C \in 𝒫 B \leftrightarrow (y \in I ⟼ C) : I ⟶ 𝒫 B$
7	4 6	sylib	$⊢ (B \in V \land \forall y \in I C \subseteq B) \to (y \in I ⟼ C) : I ⟶ 𝒫 B$
8		elrfirn	$⊢ (B \in V \land (y \in I ⟼ C) : I ⟶ 𝒫 B) \to (A \in fi (\{B\} \cup ran (y \in I ⟼ C)) \leftrightarrow \exists v \in (𝒫 I \cap Fin) A = B \cap ⋂_{z \in v} (y \in I ⟼ C) (z))$
9	7 8	syldan	$⊢ (B \in V \land \forall y \in I C \subseteq B) \to (A \in fi (\{B\} \cup ran (y \in I ⟼ C)) \leftrightarrow \exists v \in (𝒫 I \cap Fin) A = B \cap ⋂_{z \in v} (y \in I ⟼ C) (z))$
10		inss1	$⊢ 𝒫 I \cap Fin \subseteq 𝒫 I$
11	10	sseli	$⊢ v \in (𝒫 I \cap Fin) \to v \in 𝒫 I$
12	11	elpwid	$⊢ v \in (𝒫 I \cap Fin) \to v \subseteq I$
13		nffvmpt1	$⊢ \underline{Ⅎ} y (y \in I ⟼ C) (z)$
14		nfcv	$⊢ \underline{Ⅎ} z (y \in I ⟼ C) (y)$
15		fveq2	$⊢ z = y \to (y \in I ⟼ C) (z) = (y \in I ⟼ C) (y)$
16	13 14 15	cbviin	$⊢ ⋂_{z \in v} (y \in I ⟼ C) (z) = ⋂_{y \in v} (y \in I ⟼ C) (y)$
17		simplr	$⊢ ((B \in V \land y \in I) \land C \subseteq B) \to y \in I$
18		simpll	$⊢ ((B \in V \land y \in I) \land C \subseteq B) \to B \in V$
19		simpr	$⊢ ((B \in V \land y \in I) \land C \subseteq B) \to C \subseteq B$
20	18 19	ssexd	$⊢ ((B \in V \land y \in I) \land C \subseteq B) \to C \in V$
21	5	fvmpt2	$⊢ (y \in I \land C \in V) \to (y \in I ⟼ C) (y) = C$
22	17 20 21	syl2anc	$⊢ ((B \in V \land y \in I) \land C \subseteq B) \to (y \in I ⟼ C) (y) = C$
23	22	ex	$⊢ (B \in V \land y \in I) \to (C \subseteq B \to (y \in I ⟼ C) (y) = C)$
24	23	ralimdva	$⊢ B \in V \to (\forall y \in I C \subseteq B \to \forall y \in I (y \in I ⟼ C) (y) = C)$
25	24	imp	$⊢ (B \in V \land \forall y \in I C \subseteq B) \to \forall y \in I (y \in I ⟼ C) (y) = C$
26		ssralv	$⊢ v \subseteq I \to (\forall y \in I (y \in I ⟼ C) (y) = C \to \forall y \in v (y \in I ⟼ C) (y) = C)$
27	25 26	mpan9	$⊢ ((B \in V \land \forall y \in I C \subseteq B) \land v \subseteq I) \to \forall y \in v (y \in I ⟼ C) (y) = C$
28		iineq2	$⊢ \forall y \in v (y \in I ⟼ C) (y) = C \to ⋂_{y \in v} (y \in I ⟼ C) (y) = ⋂_{y \in v} C$
29	27 28	syl	$⊢ ((B \in V \land \forall y \in I C \subseteq B) \land v \subseteq I) \to ⋂_{y \in v} (y \in I ⟼ C) (y) = ⋂_{y \in v} C$
30	16 29	syl5eq	$⊢ ((B \in V \land \forall y \in I C \subseteq B) \land v \subseteq I) \to ⋂_{z \in v} (y \in I ⟼ C) (z) = ⋂_{y \in v} C$
31	30	ineq2d	$⊢ ((B \in V \land \forall y \in I C \subseteq B) \land v \subseteq I) \to B \cap ⋂_{z \in v} (y \in I ⟼ C) (z) = B \cap ⋂_{y \in v} C$
32	31	eqeq2d	$⊢ ((B \in V \land \forall y \in I C \subseteq B) \land v \subseteq I) \to (A = B \cap ⋂_{z \in v} (y \in I ⟼ C) (z) \leftrightarrow A = B \cap ⋂_{y \in v} C)$
33	12 32	sylan2	$⊢ ((B \in V \land \forall y \in I C \subseteq B) \land v \in (𝒫 I \cap Fin)) \to (A = B \cap ⋂_{z \in v} (y \in I ⟼ C) (z) \leftrightarrow A = B \cap ⋂_{y \in v} C)$
34	33	rexbidva	$⊢ (B \in V \land \forall y \in I C \subseteq B) \to (\exists v \in (𝒫 I \cap Fin) A = B \cap ⋂_{z \in v} (y \in I ⟼ C) (z) \leftrightarrow \exists v \in (𝒫 I \cap Fin) A = B \cap ⋂_{y \in v} C)$
35	9 34	bitrd	$⊢ (B \in V \land \forall y \in I C \subseteq B) \to (A \in fi (\{B\} \cup ran (y \in I ⟼ C)) \leftrightarrow \exists v \in (𝒫 I \cap Fin) A = B \cap ⋂_{y \in v} C)$

Metamath Proof Explorer

Theorem elrfirn2

Proof