bnj1000

Description: Technical lemma for bnj852 . This lemma may no longer be used or have become an indirect lemma of the theorem in question (i.e. a lemma of a lemma... of the theorem). (Contributed by Jonathan Ben-Naim, 3-Jun-2011) (New usage is discouraged.)

	Ref	Expression
Hypotheses	bnj1000.1	$⊢ ψ \leftrightarrow \forall i \in ω (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))$
	bnj1000.2	No typesetting found for \|- ( ps" <-> [. G / f ]. ps ) with typecode \|-
	bnj1000.3	$⊢ G \in V$
	bnj1000.15	$⊢ C = ⋃_{y \in f (m)} pred (y, A, R)$
	bnj1000.16	$⊢ G = f \cup \{⟨n, C⟩\}$
Assertion	bnj1000	Could not format assertion : No typesetting found for \|- ( ps" <-> A. i e. _om ( suc i e. N -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) ) with typecode \|-

Proof

Step	Hyp	Ref	Expression
1		bnj1000.1	$⊢ ψ \leftrightarrow \forall i \in ω (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))$
2		bnj1000.2	Could not format ( ps" <-> [. G / f ]. ps ) : No typesetting found for \|- ( ps" <-> [. G / f ]. ps ) with typecode \|-
3		bnj1000.3	$⊢ G \in V$
4		bnj1000.15	$⊢ C = ⋃_{y \in f (m)} pred (y, A, R)$
5		bnj1000.16	$⊢ G = f \cup \{⟨n, C⟩\}$
6		df-ral	$⊢ \forall i \in ω (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)) \leftrightarrow \forall i (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)))$
7	6	bicomi	$⊢ \forall i (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow \forall i \in ω (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))$
8	7	sbcbii	$⊢ \underset{˙}{[} G / f \underset{˙}{]} \forall i (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow \underset{˙}{[} G / f \underset{˙}{]} \forall i \in ω (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))$
9		nfv	$⊢ Ⅎ f i \in ω$
10	9	sbc19.21g	$⊢ G \in V \to (\underset{˙}{[} G / f \underset{˙}{]} (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow (i \in ω \to \underset{˙}{[} G / f \underset{˙}{]} (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))))$
11	3 10	ax-mp	$⊢ \underset{˙}{[} G / f \underset{˙}{]} (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow (i \in ω \to \underset{˙}{[} G / f \underset{˙}{]} (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)))$
12		nfv	$⊢ Ⅎ f suc i \in N$
13	12	sbc19.21g	$⊢ G \in V \to (\underset{˙}{[} G / f \underset{˙}{]} (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)) \leftrightarrow (suc i \in N \to \underset{˙}{[} G / f \underset{˙}{]} f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)))$
14	3 13	ax-mp	$⊢ \underset{˙}{[} G / f \underset{˙}{]} (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)) \leftrightarrow (suc i \in N \to \underset{˙}{[} G / f \underset{˙}{]} f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))$
15		fveq1	$⊢ f = G \to f (suc i) = G (suc i)$
16		fveq1	$⊢ f = G \to f (i) = G (i)$
17		ax-5	$⊢ w \in f (i) \to \forall y w \in f (i)$
18		nfcv	$⊢ \underline{Ⅎ} y f$
19		nfcv	$⊢ \underline{Ⅎ} y n$
20		nfiu1	$⊢ \underline{Ⅎ} y ⋃_{y \in f (m)} pred (y, A, R)$
21	4 20	nfcxfr	$⊢ \underline{Ⅎ} y C$
22	19 21	nfop	$⊢ \underline{Ⅎ} y ⟨n, C⟩$
23	22	nfsn	$⊢ \underline{Ⅎ} y \{⟨n, C⟩\}$
24	18 23	nfun	$⊢ \underline{Ⅎ} y (f \cup \{⟨n, C⟩\})$
25	5 24	nfcxfr	$⊢ \underline{Ⅎ} y G$
26		nfcv	$⊢ \underline{Ⅎ} y i$
27	25 26	nffv	$⊢ \underline{Ⅎ} y G (i)$
28	27	nfcrii	$⊢ w \in G (i) \to \forall y w \in G (i)$
29	17 28	bnj1316	$⊢ f (i) = G (i) \to ⋃_{y \in f (i)} pred (y, A, R) = ⋃_{y \in G (i)} pred (y, A, R)$
30	16 29	syl	$⊢ f = G \to ⋃_{y \in f (i)} pred (y, A, R) = ⋃_{y \in G (i)} pred (y, A, R)$
31	15 30	eqeq12d	$⊢ f = G \to (f (suc i) = ⋃_{y \in f (i)} pred (y, A, R) \leftrightarrow G (suc i) = ⋃_{y \in G (i)} pred (y, A, R))$
32		fveq1	$⊢ f = e \to f (suc i) = e (suc i)$
33		fveq1	$⊢ f = e \to f (i) = e (i)$
34		ax-5	$⊢ f (i) = e (i) \to \forall y f (i) = e (i)$
35	34	bnj956	$⊢ f (i) = e (i) \to ⋃_{y \in f (i)} pred (y, A, R) = ⋃_{y \in e (i)} pred (y, A, R)$
36	33 35	syl	$⊢ f = e \to ⋃_{y \in f (i)} pred (y, A, R) = ⋃_{y \in e (i)} pred (y, A, R)$
37	32 36	eqeq12d	$⊢ f = e \to (f (suc i) = ⋃_{y \in f (i)} pred (y, A, R) \leftrightarrow e (suc i) = ⋃_{y \in e (i)} pred (y, A, R))$
38		fveq1	$⊢ e = G \to e (suc i) = G (suc i)$
39		fveq1	$⊢ e = G \to e (i) = G (i)$
40		ax-5	$⊢ w \in e (i) \to \forall y w \in e (i)$
41	40 28	bnj1316	$⊢ e (i) = G (i) \to ⋃_{y \in e (i)} pred (y, A, R) = ⋃_{y \in G (i)} pred (y, A, R)$
42	39 41	syl	$⊢ e = G \to ⋃_{y \in e (i)} pred (y, A, R) = ⋃_{y \in G (i)} pred (y, A, R)$
43	38 42	eqeq12d	$⊢ e = G \to (e (suc i) = ⋃_{y \in e (i)} pred (y, A, R) \leftrightarrow G (suc i) = ⋃_{y \in G (i)} pred (y, A, R))$
44	3 31 37 43	bnj610	$⊢ \underset{˙}{[} G / f \underset{˙}{]} f (suc i) = ⋃_{y \in f (i)} pred (y, A, R) \leftrightarrow G (suc i) = ⋃_{y \in G (i)} pred (y, A, R)$
45	44	imbi2i	$⊢ (suc i \in N \to \underset{˙}{[} G / f \underset{˙}{]} f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)) \leftrightarrow (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R))$
46	14 45	bitri	$⊢ \underset{˙}{[} G / f \underset{˙}{]} (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)) \leftrightarrow (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R))$
47	46	imbi2i	$⊢ (i \in ω \to \underset{˙}{[} G / f \underset{˙}{]} (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow (i \in ω \to (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R)))$
48	11 47	bitri	$⊢ \underset{˙}{[} G / f \underset{˙}{]} (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow (i \in ω \to (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R)))$
49	48	albii	$⊢ \forall i \underset{˙}{[} G / f \underset{˙}{]} (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow \forall i (i \in ω \to (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R)))$
50		sbcal	$⊢ \underset{˙}{[} G / f \underset{˙}{]} \forall i (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))) \leftrightarrow \forall i \underset{˙}{[} G / f \underset{˙}{]} (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)))$
51		df-ral	$⊢ \forall i \in ω (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R)) \leftrightarrow \forall i (i \in ω \to (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R)))$
52	49 50 51	3bitr4ri	$⊢ \forall i \in ω (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R)) \leftrightarrow \underset{˙}{[} G / f \underset{˙}{]} \forall i (i \in ω \to (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R)))$
53	1	sbcbii	$⊢ \underset{˙}{[} G / f \underset{˙}{]} ψ \leftrightarrow \underset{˙}{[} G / f \underset{˙}{]} \forall i \in ω (suc i \in N \to f (suc i) = ⋃_{y \in f (i)} pred (y, A, R))$
54	8 52 53	3bitr4ri	$⊢ \underset{˙}{[} G / f \underset{˙}{]} ψ \leftrightarrow \forall i \in ω (suc i \in N \to G (suc i) = ⋃_{y \in G (i)} pred (y, A, R))$
55	2 54	bitri	Could not format ( ps" <-> A. i e. _om ( suc i e. N -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) ) : No typesetting found for \|- ( ps" <-> A. i e. _om ( suc i e. N -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) ) with typecode \|-

Metamath Proof Explorer

Theorem bnj1000

Proof