dihopelvalcpre

Description: Member of value of isomorphism H for a lattice K when -. X .<_ W , given auxiliary atom Q . TODO: refactor to be shorter and more understandable; add lemmas? (Contributed by NM, 13-Mar-2014)

	Ref	Expression
Hypotheses	dihopelvalcp.b	\|- B = ( Base ` K )
	dihopelvalcp.l	\|- .<_ = ( le ` K )
	dihopelvalcp.j	\|- .\/ = ( join ` K )
	dihopelvalcp.m	\|- ./\ = ( meet ` K )
	dihopelvalcp.a	\|- A = ( Atoms ` K )
	dihopelvalcp.h	\|- H = ( LHyp ` K )
	dihopelvalcp.p	\|- P = ( ( oc ` K ) ` W )
	dihopelvalcp.t	\|- T = ( ( LTrn ` K ) ` W )
	dihopelvalcp.r	\|- R = ( ( trL ` K ) ` W )
	dihopelvalcp.e	\|- E = ( ( TEndo ` K ) ` W )
	dihopelvalcp.i	\|- I = ( ( DIsoH ` K ) ` W )
	dihopelvalcp.g	\|- G = ( iota_ g e. T ( g ` P ) = Q )
	dihopelvalcp.f	\|- F e. _V
	dihopelvalcp.s	\|- S e. _V
	dihopelvalcp.z	\|- Z = ( h e. T \|-> ( _I \|` B ) )
	dihopelvalcp.n	\|- N = ( ( DIsoB ` K ) ` W )
	dihopelvalcp.c	\|- C = ( ( DIsoC ` K ) ` W )
	dihopelvalcp.u	\|- U = ( ( DVecH ` K ) ` W )
	dihopelvalcp.d	\|- .+ = ( +g ` U )
	dihopelvalcp.v	\|- V = ( LSubSp ` U )
	dihopelvalcp.y	\|- .(+) = ( LSSum ` U )
	dihopelvalcp.o	\|- O = ( a e. E , b e. E \|-> ( h e. T \|-> ( ( a ` h ) o. ( b ` h ) ) ) )
Assertion	dihopelvalcpre	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( <. F , S >. e. ( I ` X ) <-> ( ( F e. T /\ S e. E ) /\ ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) ) )

Proof

Step	Hyp	Ref	Expression
1		dihopelvalcp.b	\|- B = ( Base ` K )
2		dihopelvalcp.l	\|- .<_ = ( le ` K )
3		dihopelvalcp.j	\|- .\/ = ( join ` K )
4		dihopelvalcp.m	\|- ./\ = ( meet ` K )
5		dihopelvalcp.a	\|- A = ( Atoms ` K )
6		dihopelvalcp.h	\|- H = ( LHyp ` K )
7		dihopelvalcp.p	\|- P = ( ( oc ` K ) ` W )
8		dihopelvalcp.t	\|- T = ( ( LTrn ` K ) ` W )
9		dihopelvalcp.r	\|- R = ( ( trL ` K ) ` W )
10		dihopelvalcp.e	\|- E = ( ( TEndo ` K ) ` W )
11		dihopelvalcp.i	\|- I = ( ( DIsoH ` K ) ` W )
12		dihopelvalcp.g	\|- G = ( iota_ g e. T ( g ` P ) = Q )
13		dihopelvalcp.f	\|- F e. _V
14		dihopelvalcp.s	\|- S e. _V
15		dihopelvalcp.z	\|- Z = ( h e. T \|-> ( _I \|` B ) )
16		dihopelvalcp.n	\|- N = ( ( DIsoB ` K ) ` W )
17		dihopelvalcp.c	\|- C = ( ( DIsoC ` K ) ` W )
18		dihopelvalcp.u	\|- U = ( ( DVecH ` K ) ` W )
19		dihopelvalcp.d	\|- .+ = ( +g ` U )
20		dihopelvalcp.v	\|- V = ( LSubSp ` U )
21		dihopelvalcp.y	\|- .(+) = ( LSSum ` U )
22		dihopelvalcp.o	\|- O = ( a e. E , b e. E \|-> ( h e. T \|-> ( ( a ` h ) o. ( b ` h ) ) ) )
23	1 2 3 4 5 6 11 16 17 18 21	dihvalcq	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( I ` X ) = ( ( C ` Q ) .(+) ( N ` ( X ./\ W ) ) ) )
24	23	eleq2d	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( <. F , S >. e. ( I ` X ) <-> <. F , S >. e. ( ( C ` Q ) .(+) ( N ` ( X ./\ W ) ) ) ) )
25		simp1	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( K e. HL /\ W e. H ) )
26		simp3l	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( Q e. A /\ -. Q .<_ W ) )
27	2 5 6 18 17 20	diclss	\|- ( ( ( K e. HL /\ W e. H ) /\ ( Q e. A /\ -. Q .<_ W ) ) -> ( C ` Q ) e. V )
28	25 26 27	syl2anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( C ` Q ) e. V )
29		simp1l	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> K e. HL )
30	29	hllatd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> K e. Lat )
31		simp2l	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> X e. B )
32		simp1r	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> W e. H )
33	1 6	lhpbase	\|- ( W e. H -> W e. B )
34	32 33	syl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> W e. B )
35	1 4	latmcl	\|- ( ( K e. Lat /\ X e. B /\ W e. B ) -> ( X ./\ W ) e. B )
36	30 31 34 35	syl3anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( X ./\ W ) e. B )
37	1 2 4	latmle2	\|- ( ( K e. Lat /\ X e. B /\ W e. B ) -> ( X ./\ W ) .<_ W )
38	30 31 34 37	syl3anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( X ./\ W ) .<_ W )
39	1 2 6 18 16 20	diblss	\|- ( ( ( K e. HL /\ W e. H ) /\ ( ( X ./\ W ) e. B /\ ( X ./\ W ) .<_ W ) ) -> ( N ` ( X ./\ W ) ) e. V )
40	25 36 38 39	syl12anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( N ` ( X ./\ W ) ) e. V )
41	6 18 19 20 21	dvhopellsm	\|- ( ( ( K e. HL /\ W e. H ) /\ ( C ` Q ) e. V /\ ( N ` ( X ./\ W ) ) e. V ) -> ( <. F , S >. e. ( ( C ` Q ) .(+) ( N ` ( X ./\ W ) ) ) <-> E. x E. y E. z E. w ( ( <. x , y >. e. ( C ` Q ) /\ <. z , w >. e. ( N ` ( X ./\ W ) ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) ) )
42	25 28 40 41	syl3anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( <. F , S >. e. ( ( C ` Q ) .(+) ( N ` ( X ./\ W ) ) ) <-> E. x E. y E. z E. w ( ( <. x , y >. e. ( C ` Q ) /\ <. z , w >. e. ( N ` ( X ./\ W ) ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) ) )
43		vex	\|- x e. _V
44		vex	\|- y e. _V
45	2 5 6 7 8 10 17 12 43 44	dicopelval2	\|- ( ( ( K e. HL /\ W e. H ) /\ ( Q e. A /\ -. Q .<_ W ) ) -> ( <. x , y >. e. ( C ` Q ) <-> ( x = ( y ` G ) /\ y e. E ) ) )
46	25 26 45	syl2anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( <. x , y >. e. ( C ` Q ) <-> ( x = ( y ` G ) /\ y e. E ) ) )
47	1 2 6 8 9 15 16	dibopelval3	\|- ( ( ( K e. HL /\ W e. H ) /\ ( ( X ./\ W ) e. B /\ ( X ./\ W ) .<_ W ) ) -> ( <. z , w >. e. ( N ` ( X ./\ W ) ) <-> ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) )
48	25 36 38 47	syl12anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( <. z , w >. e. ( N ` ( X ./\ W ) ) <-> ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) )
49	46 48	anbi12d	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( <. x , y >. e. ( C ` Q ) /\ <. z , w >. e. ( N ` ( X ./\ W ) ) ) <-> ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) )
50	49	anbi1d	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( <. x , y >. e. ( C ` Q ) /\ <. z , w >. e. ( N ` ( X ./\ W ) ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) <-> ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) ) )
51		simpl1	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( K e. HL /\ W e. H ) )
52		simprll	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> x = ( y ` G ) )
53		simprlr	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> y e. E )
54	2 5 6 7	lhpocnel2	\|- ( ( K e. HL /\ W e. H ) -> ( P e. A /\ -. P .<_ W ) )
55	51 54	syl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( P e. A /\ -. P .<_ W ) )
56		simpl3l	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( Q e. A /\ -. Q .<_ W ) )
57	2 5 6 8 12	ltrniotacl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( P e. A /\ -. P .<_ W ) /\ ( Q e. A /\ -. Q .<_ W ) ) -> G e. T )
58	51 55 56 57	syl3anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> G e. T )
59	6 8 10	tendocl	\|- ( ( ( K e. HL /\ W e. H ) /\ y e. E /\ G e. T ) -> ( y ` G ) e. T )
60	51 53 58 59	syl3anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( y ` G ) e. T )
61	52 60	eqeltrd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> x e. T )
62		simprll	\|- ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) -> z e. T )
63	62	adantl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> z e. T )
64		simprrr	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> w = Z )
65	1 6 8 10 15	tendo0cl	\|- ( ( K e. HL /\ W e. H ) -> Z e. E )
66	51 65	syl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> Z e. E )
67	64 66	eqeltrd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> w e. E )
68		eqid	\|- ( Scalar ` U ) = ( Scalar ` U )
69		eqid	\|- ( +g ` ( Scalar ` U ) ) = ( +g ` ( Scalar ` U ) )
70	6 8 10 18 68 19 69	dvhopvadd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( x e. T /\ y e. E ) /\ ( z e. T /\ w e. E ) ) -> ( <. x , y >. .+ <. z , w >. ) = <. ( x o. z ) , ( y ( +g ` ( Scalar ` U ) ) w ) >. )
71	51 61 53 63 67 70	syl122anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( <. x , y >. .+ <. z , w >. ) = <. ( x o. z ) , ( y ( +g ` ( Scalar ` U ) ) w ) >. )
72	6 8 10 18 68 22 69	dvhfplusr	\|- ( ( K e. HL /\ W e. H ) -> ( +g ` ( Scalar ` U ) ) = O )
73	51 72	syl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( +g ` ( Scalar ` U ) ) = O )
74	73	oveqd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( y ( +g ` ( Scalar ` U ) ) w ) = ( y O w ) )
75	74	opeq2d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> <. ( x o. z ) , ( y ( +g ` ( Scalar ` U ) ) w ) >. = <. ( x o. z ) , ( y O w ) >. )
76	71 75	eqtrd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( <. x , y >. .+ <. z , w >. ) = <. ( x o. z ) , ( y O w ) >. )
77	76	eqeq2d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( <. F , S >. = ( <. x , y >. .+ <. z , w >. ) <-> <. F , S >. = <. ( x o. z ) , ( y O w ) >. ) )
78	13 14	opth	\|- ( <. F , S >. = <. ( x o. z ) , ( y O w ) >. <-> ( F = ( x o. z ) /\ S = ( y O w ) ) )
79	64	oveq2d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( y O w ) = ( y O Z ) )
80	1 6 8 10 15 22	tendo0plr	\|- ( ( ( K e. HL /\ W e. H ) /\ y e. E ) -> ( y O Z ) = y )
81	51 53 80	syl2anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( y O Z ) = y )
82	79 81	eqtrd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( y O w ) = y )
83	82	eqeq2d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( S = ( y O w ) <-> S = y ) )
84	83	anbi2d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( ( F = ( x o. z ) /\ S = ( y O w ) ) <-> ( F = ( x o. z ) /\ S = y ) ) )
85	78 84	bitrid	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( <. F , S >. = <. ( x o. z ) , ( y O w ) >. <-> ( F = ( x o. z ) /\ S = y ) ) )
86	77 85	bitrd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) ) -> ( <. F , S >. = ( <. x , y >. .+ <. z , w >. ) <-> ( F = ( x o. z ) /\ S = y ) ) )
87	86	pm5.32da	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) <-> ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) )
88		simplll	\|- ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) -> x = ( y ` G ) )
89	88	adantl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> x = ( y ` G ) )
90		simprrr	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> S = y )
91	90	fveq1d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( S ` G ) = ( y ` G ) )
92	89 91	eqtr4d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> x = ( S ` G ) )
93	90	eqcomd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> y = S )
94		coass	\|- ( ( `' ( S ` G ) o. ( S ` G ) ) o. z ) = ( `' ( S ` G ) o. ( ( S ` G ) o. z ) )
95		simpl1	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( K e. HL /\ W e. H ) )
96		simpllr	\|- ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) -> y e. E )
97	96	adantl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> y e. E )
98	90 97	eqeltrd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> S e. E )
99	58	adantrr	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> G e. T )
100	6 8 10	tendocl	\|- ( ( ( K e. HL /\ W e. H ) /\ S e. E /\ G e. T ) -> ( S ` G ) e. T )
101	95 98 99 100	syl3anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( S ` G ) e. T )
102	1 6 8	ltrn1o	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S ` G ) e. T ) -> ( S ` G ) : B -1-1-onto-> B )
103	95 101 102	syl2anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( S ` G ) : B -1-1-onto-> B )
104		f1ococnv1	\|- ( ( S ` G ) : B -1-1-onto-> B -> ( `' ( S ` G ) o. ( S ` G ) ) = ( _I \|` B ) )
105	103 104	syl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( `' ( S ` G ) o. ( S ` G ) ) = ( _I \|` B ) )
106	105	coeq1d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( ( `' ( S ` G ) o. ( S ` G ) ) o. z ) = ( ( _I \|` B ) o. z ) )
107	62	ad2antrl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> z e. T )
108	1 6 8	ltrn1o	\|- ( ( ( K e. HL /\ W e. H ) /\ z e. T ) -> z : B -1-1-onto-> B )
109	95 107 108	syl2anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> z : B -1-1-onto-> B )
110		f1of	\|- ( z : B -1-1-onto-> B -> z : B --> B )
111		fcoi2	\|- ( z : B --> B -> ( ( _I \|` B ) o. z ) = z )
112	109 110 111	3syl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( ( _I \|` B ) o. z ) = z )
113	106 112	eqtr2d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> z = ( ( `' ( S ` G ) o. ( S ` G ) ) o. z ) )
114		simprrl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> F = ( x o. z ) )
115	92	coeq1d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( x o. z ) = ( ( S ` G ) o. z ) )
116	114 115	eqtrd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> F = ( ( S ` G ) o. z ) )
117	116	coeq1d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( F o. `' ( S ` G ) ) = ( ( ( S ` G ) o. z ) o. `' ( S ` G ) ) )
118	6 8	ltrncnv	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S ` G ) e. T ) -> `' ( S ` G ) e. T )
119	95 101 118	syl2anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> `' ( S ` G ) e. T )
120	6 8	ltrnco	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S ` G ) e. T /\ z e. T ) -> ( ( S ` G ) o. z ) e. T )
121	95 101 107 120	syl3anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( ( S ` G ) o. z ) e. T )
122	6 8	ltrncom	\|- ( ( ( K e. HL /\ W e. H ) /\ `' ( S ` G ) e. T /\ ( ( S ` G ) o. z ) e. T ) -> ( `' ( S ` G ) o. ( ( S ` G ) o. z ) ) = ( ( ( S ` G ) o. z ) o. `' ( S ` G ) ) )
123	95 119 121 122	syl3anc	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( `' ( S ` G ) o. ( ( S ` G ) o. z ) ) = ( ( ( S ` G ) o. z ) o. `' ( S ` G ) ) )
124	117 123	eqtr4d	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( F o. `' ( S ` G ) ) = ( `' ( S ` G ) o. ( ( S ` G ) o. z ) ) )
125	94 113 124	3eqtr4a	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> z = ( F o. `' ( S ` G ) ) )
126		simplrr	\|- ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) -> w = Z )
127	126	adantl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> w = Z )
128	125 127	jca	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) )
129	92 93 128	jca31	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) )
130	129	ex	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) -> ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) )
131	130	pm4.71rd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) <-> ( ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) ) )
132	87 131	bitrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) <-> ( ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) ) )
133		simprrl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> F = ( x o. z ) )
134		simpll1	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( K e. HL /\ W e. H ) )
135	88	adantl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> x = ( y ` G ) )
136	96	adantl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> y e. E )
137	134 54	syl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( P e. A /\ -. P .<_ W ) )
138		simpl3l	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> ( Q e. A /\ -. Q .<_ W ) )
139	138	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( Q e. A /\ -. Q .<_ W ) )
140	134 137 139 57	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> G e. T )
141	134 136 140 59	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( y ` G ) e. T )
142	135 141	eqeltrd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> x e. T )
143	62	ad2antrl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> z e. T )
144	6 8	ltrnco	\|- ( ( ( K e. HL /\ W e. H ) /\ x e. T /\ z e. T ) -> ( x o. z ) e. T )
145	134 142 143 144	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( x o. z ) e. T )
146	133 145	eqeltrd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> F e. T )
147		simpl1l	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> K e. HL )
148	147	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> K e. HL )
149	148	hllatd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> K e. Lat )
150	1 6 8 9	trlcl	\|- ( ( ( K e. HL /\ W e. H ) /\ z e. T ) -> ( R ` z ) e. B )
151	134 143 150	syl2anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( R ` z ) e. B )
152		simpl2l	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> X e. B )
153	152	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> X e. B )
154		simpl1r	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> W e. H )
155	154	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> W e. H )
156	155 33	syl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> W e. B )
157	149 153 156 35	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( X ./\ W ) e. B )
158		simprlr	\|- ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) -> ( R ` z ) .<_ ( X ./\ W ) )
159	158	ad2antrl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( R ` z ) .<_ ( X ./\ W ) )
160	1 2 4	latmle1	\|- ( ( K e. Lat /\ X e. B /\ W e. B ) -> ( X ./\ W ) .<_ X )
161	149 153 156 160	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( X ./\ W ) .<_ X )
162	1 2 149 151 157 153 159 161	lattrd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( R ` z ) .<_ X )
163	146 136 162	jca31	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) -> ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) )
164		simprll	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> x = ( S ` G ) )
165	164	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> x = ( S ` G ) )
166		simprlr	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> y = S )
167	166	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> y = S )
168	167	fveq1d	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( y ` G ) = ( S ` G ) )
169	165 168	eqtr4d	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> x = ( y ` G ) )
170		simprlr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> y e. E )
171	169 170	jca	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( x = ( y ` G ) /\ y e. E ) )
172		simprrl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> z = ( F o. `' ( S ` G ) ) )
173	172	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> z = ( F o. `' ( S ` G ) ) )
174		simpll1	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( K e. HL /\ W e. H ) )
175		simprll	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> F e. T )
176	167 170	eqeltrrd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> S e. E )
177	174 54	syl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( P e. A /\ -. P .<_ W ) )
178	138	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( Q e. A /\ -. Q .<_ W ) )
179	174 177 178 57	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> G e. T )
180	174 176 179 100	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( S ` G ) e. T )
181	174 180 118	syl2anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> `' ( S ` G ) e. T )
182	6 8	ltrnco	\|- ( ( ( K e. HL /\ W e. H ) /\ F e. T /\ `' ( S ` G ) e. T ) -> ( F o. `' ( S ` G ) ) e. T )
183	174 175 181 182	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( F o. `' ( S ` G ) ) e. T )
184	173 183	eqeltrd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> z e. T )
185		simprr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( R ` z ) .<_ X )
186	2 6 8 9	trlle	\|- ( ( ( K e. HL /\ W e. H ) /\ z e. T ) -> ( R ` z ) .<_ W )
187	174 184 186	syl2anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( R ` z ) .<_ W )
188	147	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> K e. HL )
189	188	hllatd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> K e. Lat )
190	174 184 150	syl2anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( R ` z ) e. B )
191	152	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> X e. B )
192	154	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> W e. H )
193	192 33	syl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> W e. B )
194	1 2 4	latlem12	\|- ( ( K e. Lat /\ ( ( R ` z ) e. B /\ X e. B /\ W e. B ) ) -> ( ( ( R ` z ) .<_ X /\ ( R ` z ) .<_ W ) <-> ( R ` z ) .<_ ( X ./\ W ) ) )
195	189 190 191 193 194	syl13anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( ( ( R ` z ) .<_ X /\ ( R ` z ) .<_ W ) <-> ( R ` z ) .<_ ( X ./\ W ) ) )
196	185 187 195	mpbi2and	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( R ` z ) .<_ ( X ./\ W ) )
197		simprrr	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> w = Z )
198	197	adantr	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> w = Z )
199	184 196 198	jca31	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) )
200	174 180 102	syl2anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( S ` G ) : B -1-1-onto-> B )
201	200 104	syl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( `' ( S ` G ) o. ( S ` G ) ) = ( _I \|` B ) )
202	201	coeq2d	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( F o. ( `' ( S ` G ) o. ( S ` G ) ) ) = ( F o. ( _I \|` B ) ) )
203	1 6 8	ltrn1o	\|- ( ( ( K e. HL /\ W e. H ) /\ F e. T ) -> F : B -1-1-onto-> B )
204	174 175 203	syl2anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> F : B -1-1-onto-> B )
205		f1of	\|- ( F : B -1-1-onto-> B -> F : B --> B )
206		fcoi1	\|- ( F : B --> B -> ( F o. ( _I \|` B ) ) = F )
207	204 205 206	3syl	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( F o. ( _I \|` B ) ) = F )
208	202 207	eqtr2d	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> F = ( F o. ( `' ( S ` G ) o. ( S ` G ) ) ) )
209		coass	\|- ( ( F o. `' ( S ` G ) ) o. ( S ` G ) ) = ( F o. ( `' ( S ` G ) o. ( S ` G ) ) )
210	208 209	eqtr4di	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> F = ( ( F o. `' ( S ` G ) ) o. ( S ` G ) ) )
211	6 8	ltrncom	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S ` G ) e. T /\ ( F o. `' ( S ` G ) ) e. T ) -> ( ( S ` G ) o. ( F o. `' ( S ` G ) ) ) = ( ( F o. `' ( S ` G ) ) o. ( S ` G ) ) )
212	174 180 183 211	syl3anc	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( ( S ` G ) o. ( F o. `' ( S ` G ) ) ) = ( ( F o. `' ( S ` G ) ) o. ( S ` G ) ) )
213	210 212	eqtr4d	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> F = ( ( S ` G ) o. ( F o. `' ( S ` G ) ) ) )
214	165 173	coeq12d	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( x o. z ) = ( ( S ` G ) o. ( F o. `' ( S ` G ) ) ) )
215	213 214	eqtr4d	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> F = ( x o. z ) )
216	167	eqcomd	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> S = y )
217	215 216	jca	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( F = ( x o. z ) /\ S = y ) )
218	171 199 217	jca31	\|- ( ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) -> ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) )
219	163 218	impbida	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) /\ ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) ) -> ( ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) <-> ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) )
220	219	pm5.32da	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) <-> ( ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) ) )
221		df-3an	\|- ( ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) <-> ( ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) )
222	220 221	bitr4di	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) ) /\ ( ( ( x = ( y ` G ) /\ y e. E ) /\ ( ( z e. T /\ ( R ` z ) .<_ ( X ./\ W ) ) /\ w = Z ) ) /\ ( F = ( x o. z ) /\ S = y ) ) ) <-> ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) ) )
223	50 132 222	3bitrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( ( ( <. x , y >. e. ( C ` Q ) /\ <. z , w >. e. ( N ` ( X ./\ W ) ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) <-> ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) ) )
224	223	4exbidv	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( E. x E. y E. z E. w ( ( <. x , y >. e. ( C ` Q ) /\ <. z , w >. e. ( N ` ( X ./\ W ) ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) <-> E. x E. y E. z E. w ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) ) )
225		fvex	\|- ( S ` G ) e. _V
226	225	cnvex	\|- `' ( S ` G ) e. _V
227	13 226	coex	\|- ( F o. `' ( S ` G ) ) e. _V
228	8	fvexi	\|- T e. _V
229	228	mptex	\|- ( h e. T \|-> ( _I \|` B ) ) e. _V
230	15 229	eqeltri	\|- Z e. _V
231		biidd	\|- ( x = ( S ` G ) -> ( ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) <-> ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) )
232		eleq1	\|- ( y = S -> ( y e. E <-> S e. E ) )
233	232	anbi2d	\|- ( y = S -> ( ( F e. T /\ y e. E ) <-> ( F e. T /\ S e. E ) ) )
234	233	anbi1d	\|- ( y = S -> ( ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) <-> ( ( F e. T /\ S e. E ) /\ ( R ` z ) .<_ X ) ) )
235		fveq2	\|- ( z = ( F o. `' ( S ` G ) ) -> ( R ` z ) = ( R ` ( F o. `' ( S ` G ) ) ) )
236	235	breq1d	\|- ( z = ( F o. `' ( S ` G ) ) -> ( ( R ` z ) .<_ X <-> ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) )
237	236	anbi2d	\|- ( z = ( F o. `' ( S ` G ) ) -> ( ( ( F e. T /\ S e. E ) /\ ( R ` z ) .<_ X ) <-> ( ( F e. T /\ S e. E ) /\ ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) ) )
238		biidd	\|- ( w = Z -> ( ( ( F e. T /\ S e. E ) /\ ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) <-> ( ( F e. T /\ S e. E ) /\ ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) ) )
239	225 14 227 230 231 234 237 238	ceqsex4v	\|- ( E. x E. y E. z E. w ( ( x = ( S ` G ) /\ y = S ) /\ ( z = ( F o. `' ( S ` G ) ) /\ w = Z ) /\ ( ( F e. T /\ y e. E ) /\ ( R ` z ) .<_ X ) ) <-> ( ( F e. T /\ S e. E ) /\ ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) )
240	224 239	bitrdi	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( E. x E. y E. z E. w ( ( <. x , y >. e. ( C ` Q ) /\ <. z , w >. e. ( N ` ( X ./\ W ) ) ) /\ <. F , S >. = ( <. x , y >. .+ <. z , w >. ) ) <-> ( ( F e. T /\ S e. E ) /\ ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) ) )
241	24 42 240	3bitrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( X e. B /\ -. X .<_ W ) /\ ( ( Q e. A /\ -. Q .<_ W ) /\ ( Q .\/ ( X ./\ W ) ) = X ) ) -> ( <. F , S >. e. ( I ` X ) <-> ( ( F e. T /\ S e. E ) /\ ( R ` ( F o. `' ( S ` G ) ) ) .<_ X ) ) )

Metamath Proof Explorer

Theorem dihopelvalcpre

Proof