bnj571

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	bnj571.3	\|- D = ( _om \ { (/) } )
	bnj571.16	\|- G = ( f u. { <. m , U_ y e. ( f ` p ) _pred ( y , A , R ) >. } )
	bnj571.17	\|- ( ta <-> ( f Fn m /\ ph' /\ ps' ) )
	bnj571.18	\|- ( si <-> ( m e. D /\ n = suc m /\ p e. m ) )
	bnj571.19	\|- ( et <-> ( m e. D /\ n = suc m /\ p e. _om /\ m = suc p ) )
	bnj571.20	\|- ( ze <-> ( i e. _om /\ suc i e. n /\ m = suc i ) )
	bnj571.22	\|- B = U_ y e. ( f ` i ) _pred ( y , A , R )
	bnj571.23	\|- C = U_ y e. ( f ` p ) _pred ( y , A , R )
	bnj571.24	\|- K = U_ y e. ( G ` i ) _pred ( y , A , R )
	bnj571.25	\|- L = U_ y e. ( G ` p ) _pred ( y , A , R )
	bnj571.26	\|- G = ( f u. { <. m , C >. } )
	bnj571.29	\|- ( ph' <-> ( f ` (/) ) = _pred ( x , A , R ) )
	bnj571.30	\|- ( ps' <-> A. i e. _om ( suc i e. m -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) )
	bnj571.38	\|- ( ( R _FrSe A /\ ta /\ si ) -> G Fn n )
	bnj571.21	\|- ( rh <-> ( i e. _om /\ suc i e. n /\ m =/= suc i ) )
	bnj571.40	\|- ( ( R _FrSe A /\ ta /\ et ) -> G Fn n )
	bnj571.33	\|- ( ps" <-> A. i e. _om ( suc i e. n -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) )
Assertion	bnj571	\|- ( ( R _FrSe A /\ ta /\ et ) -> ps" )

Proof

Step	Hyp	Ref	Expression
1		bnj571.3	\|- D = ( _om \ { (/) } )
2		bnj571.16	\|- G = ( f u. { <. m , U_ y e. ( f ` p ) _pred ( y , A , R ) >. } )
3		bnj571.17	\|- ( ta <-> ( f Fn m /\ ph' /\ ps' ) )
4		bnj571.18	\|- ( si <-> ( m e. D /\ n = suc m /\ p e. m ) )
5		bnj571.19	\|- ( et <-> ( m e. D /\ n = suc m /\ p e. _om /\ m = suc p ) )
6		bnj571.20	\|- ( ze <-> ( i e. _om /\ suc i e. n /\ m = suc i ) )
7		bnj571.22	\|- B = U_ y e. ( f ` i ) _pred ( y , A , R )
8		bnj571.23	\|- C = U_ y e. ( f ` p ) _pred ( y , A , R )
9		bnj571.24	\|- K = U_ y e. ( G ` i ) _pred ( y , A , R )
10		bnj571.25	\|- L = U_ y e. ( G ` p ) _pred ( y , A , R )
11		bnj571.26	\|- G = ( f u. { <. m , C >. } )
12		bnj571.29	\|- ( ph' <-> ( f ` (/) ) = _pred ( x , A , R ) )
13		bnj571.30	\|- ( ps' <-> A. i e. _om ( suc i e. m -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) )
14		bnj571.38	\|- ( ( R _FrSe A /\ ta /\ si ) -> G Fn n )
15		bnj571.21	\|- ( rh <-> ( i e. _om /\ suc i e. n /\ m =/= suc i ) )
16		bnj571.40	\|- ( ( R _FrSe A /\ ta /\ et ) -> G Fn n )
17		bnj571.33	\|- ( ps" <-> A. i e. _om ( suc i e. n -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) )
18		nfv	\|- F/ i R _FrSe A
19		nfv	\|- F/ i f Fn m
20		nfv	\|- F/ i ph'
21		nfra1	\|- F/ i A. i e. _om ( suc i e. m -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) )
22	13 21	nfxfr	\|- F/ i ps'
23	19 20 22	nf3an	\|- F/ i ( f Fn m /\ ph' /\ ps' )
24	3 23	nfxfr	\|- F/ i ta
25		nfv	\|- F/ i et
26	18 24 25	nf3an	\|- F/ i ( R _FrSe A /\ ta /\ et )
27		df-bnj17	\|- ( ( R _FrSe A /\ ta /\ et /\ ze ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ ze ) )
28		3anass	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) /\ m = suc i ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ ( ( i e. _om /\ suc i e. n ) /\ m = suc i ) ) )
29		3anrot	\|- ( ( m = suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) /\ m = suc i ) )
30		df-3an	\|- ( ( i e. _om /\ suc i e. n /\ m = suc i ) <-> ( ( i e. _om /\ suc i e. n ) /\ m = suc i ) )
31	6 30	bitri	\|- ( ze <-> ( ( i e. _om /\ suc i e. n ) /\ m = suc i ) )
32	31	anbi2i	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ ze ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ ( ( i e. _om /\ suc i e. n ) /\ m = suc i ) ) )
33	28 29 32	3bitr4ri	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ ze ) <-> ( m = suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) )
34	27 33	bitri	\|- ( ( R _FrSe A /\ ta /\ et /\ ze ) <-> ( m = suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) )
35	1 2 3 4 5 6 7 8 9 10 11 12 13 14	bnj558	\|- ( ( R _FrSe A /\ ta /\ et /\ ze ) -> ( G ` suc i ) = K )
36	34 35	sylbir	\|- ( ( m = suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) -> ( G ` suc i ) = K )
37	36	3expib	\|- ( m = suc i -> ( ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) -> ( G ` suc i ) = K ) )
38		df-bnj17	\|- ( ( R _FrSe A /\ ta /\ et /\ rh ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ rh ) )
39		3anass	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) /\ m =/= suc i ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ ( ( i e. _om /\ suc i e. n ) /\ m =/= suc i ) ) )
40		3anrot	\|- ( ( m =/= suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) /\ m =/= suc i ) )
41		df-3an	\|- ( ( i e. _om /\ suc i e. n /\ m =/= suc i ) <-> ( ( i e. _om /\ suc i e. n ) /\ m =/= suc i ) )
42	15 41	bitri	\|- ( rh <-> ( ( i e. _om /\ suc i e. n ) /\ m =/= suc i ) )
43	42	anbi2i	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ rh ) <-> ( ( R _FrSe A /\ ta /\ et ) /\ ( ( i e. _om /\ suc i e. n ) /\ m =/= suc i ) ) )
44	39 40 43	3bitr4ri	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ rh ) <-> ( m =/= suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) )
45	38 44	bitri	\|- ( ( R _FrSe A /\ ta /\ et /\ rh ) <-> ( m =/= suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) )
46	1 3 5 15 9 2 16 13	bnj570	\|- ( ( R _FrSe A /\ ta /\ et /\ rh ) -> ( G ` suc i ) = K )
47	45 46	sylbir	\|- ( ( m =/= suc i /\ ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) -> ( G ` suc i ) = K )
48	47	3expib	\|- ( m =/= suc i -> ( ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) -> ( G ` suc i ) = K ) )
49	37 48	pm2.61ine	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) -> ( G ` suc i ) = K )
50	49 9	eqtrdi	\|- ( ( ( R _FrSe A /\ ta /\ et ) /\ ( i e. _om /\ suc i e. n ) ) -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) )
51	50	exp32	\|- ( ( R _FrSe A /\ ta /\ et ) -> ( i e. _om -> ( suc i e. n -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) ) )
52	26 51	alrimi	\|- ( ( R _FrSe A /\ ta /\ et ) -> A. i ( i e. _om -> ( suc i e. n -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) ) )
53	17	bnj946	\|- ( ps" <-> A. i ( i e. _om -> ( suc i e. n -> ( G ` suc i ) = U_ y e. ( G ` i ) _pred ( y , A , R ) ) ) )
54	52 53	sylibr	\|- ( ( R _FrSe A /\ ta /\ et ) -> ps" )

Metamath Proof Explorer

Theorem bnj571

Proof