dihintcl

Description: The intersection of closed subspaces (the range of isomorphism H) is a closed subspace. (Contributed by NM, 14-Apr-2014)

	Ref	Expression
Hypotheses	dihintcl.h	\|- H = ( LHyp ` K )
	dihintcl.i	\|- I = ( ( DIsoH ` K ) ` W )
Assertion	dihintcl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> \|^\| S e. ran I )

Proof

Step	Hyp	Ref	Expression
1		dihintcl.h	\|- H = ( LHyp ` K )
2		dihintcl.i	\|- I = ( ( DIsoH ` K ) ` W )
3		eqid	\|- ( Base ` K ) = ( Base ` K )
4	3 1 2	dihfn	\|- ( ( K e. HL /\ W e. H ) -> I Fn ( Base ` K ) )
5	3 1 2	dihdm	\|- ( ( K e. HL /\ W e. H ) -> dom I = ( Base ` K ) )
6	5	fneq2d	\|- ( ( K e. HL /\ W e. H ) -> ( I Fn dom I <-> I Fn ( Base ` K ) ) )
7	4 6	mpbird	\|- ( ( K e. HL /\ W e. H ) -> I Fn dom I )
8	7	adantr	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> I Fn dom I )
9		cnvimass	\|- ( `' I " S ) C_ dom I
10		fnssres	\|- ( ( I Fn dom I /\ ( `' I " S ) C_ dom I ) -> ( I \|` ( `' I " S ) ) Fn ( `' I " S ) )
11	8 9 10	sylancl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( I \|` ( `' I " S ) ) Fn ( `' I " S ) )
12		fniinfv	\|- ( ( I \|` ( `' I " S ) ) Fn ( `' I " S ) -> \|^\|_ y e. ( `' I " S ) ( ( I \|` ( `' I " S ) ) ` y ) = \|^\| ran ( I \|` ( `' I " S ) ) )
13	11 12	syl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> \|^\|_ y e. ( `' I " S ) ( ( I \|` ( `' I " S ) ) ` y ) = \|^\| ran ( I \|` ( `' I " S ) ) )
14		df-ima	\|- ( I " ( `' I " S ) ) = ran ( I \|` ( `' I " S ) )
15	4	adantr	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> I Fn ( Base ` K ) )
16		dffn4	\|- ( I Fn ( Base ` K ) <-> I : ( Base ` K ) -onto-> ran I )
17	15 16	sylib	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> I : ( Base ` K ) -onto-> ran I )
18		simprl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> S C_ ran I )
19		foimacnv	\|- ( ( I : ( Base ` K ) -onto-> ran I /\ S C_ ran I ) -> ( I " ( `' I " S ) ) = S )
20	17 18 19	syl2anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( I " ( `' I " S ) ) = S )
21	14 20	eqtr3id	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ran ( I \|` ( `' I " S ) ) = S )
22	21	inteqd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> \|^\| ran ( I \|` ( `' I " S ) ) = \|^\| S )
23	13 22	eqtrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> \|^\|_ y e. ( `' I " S ) ( ( I \|` ( `' I " S ) ) ` y ) = \|^\| S )
24		simpl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( K e. HL /\ W e. H ) )
25	5	adantr	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> dom I = ( Base ` K ) )
26	9 25	sseqtrid	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( `' I " S ) C_ ( Base ` K ) )
27		simprr	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> S =/= (/) )
28		n0	\|- ( S =/= (/) <-> E. y y e. S )
29	27 28	sylib	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> E. y y e. S )
30	18	sselda	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ y e. S ) -> y e. ran I )
31	25	fneq2d	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( I Fn dom I <-> I Fn ( Base ` K ) ) )
32	15 31	mpbird	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> I Fn dom I )
33	32	adantr	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ y e. S ) -> I Fn dom I )
34		fvelrnb	\|- ( I Fn dom I -> ( y e. ran I <-> E. x e. dom I ( I ` x ) = y ) )
35	33 34	syl	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ y e. S ) -> ( y e. ran I <-> E. x e. dom I ( I ` x ) = y ) )
36	30 35	mpbid	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ y e. S ) -> E. x e. dom I ( I ` x ) = y )
37		fnfun	\|- ( I Fn ( Base ` K ) -> Fun I )
38	15 37	syl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> Fun I )
39		fvimacnv	\|- ( ( Fun I /\ x e. dom I ) -> ( ( I ` x ) e. S <-> x e. ( `' I " S ) ) )
40	38 39	sylan	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ x e. dom I ) -> ( ( I ` x ) e. S <-> x e. ( `' I " S ) ) )
41		ne0i	\|- ( x e. ( `' I " S ) -> ( `' I " S ) =/= (/) )
42	40 41	biimtrdi	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ x e. dom I ) -> ( ( I ` x ) e. S -> ( `' I " S ) =/= (/) ) )
43	42	ex	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( x e. dom I -> ( ( I ` x ) e. S -> ( `' I " S ) =/= (/) ) ) )
44		eleq1	\|- ( ( I ` x ) = y -> ( ( I ` x ) e. S <-> y e. S ) )
45	44	biimprd	\|- ( ( I ` x ) = y -> ( y e. S -> ( I ` x ) e. S ) )
46	45	imim1d	\|- ( ( I ` x ) = y -> ( ( ( I ` x ) e. S -> ( `' I " S ) =/= (/) ) -> ( y e. S -> ( `' I " S ) =/= (/) ) ) )
47	43 46	syl9	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( ( I ` x ) = y -> ( x e. dom I -> ( y e. S -> ( `' I " S ) =/= (/) ) ) ) )
48	47	com24	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( y e. S -> ( x e. dom I -> ( ( I ` x ) = y -> ( `' I " S ) =/= (/) ) ) ) )
49	48	imp	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ y e. S ) -> ( x e. dom I -> ( ( I ` x ) = y -> ( `' I " S ) =/= (/) ) ) )
50	49	rexlimdv	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ y e. S ) -> ( E. x e. dom I ( I ` x ) = y -> ( `' I " S ) =/= (/) ) )
51	36 50	mpd	\|- ( ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) /\ y e. S ) -> ( `' I " S ) =/= (/) )
52	29 51	exlimddv	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( `' I " S ) =/= (/) )
53		eqid	\|- ( glb ` K ) = ( glb ` K )
54	3 53 1 2	dihglb	\|- ( ( ( K e. HL /\ W e. H ) /\ ( ( `' I " S ) C_ ( Base ` K ) /\ ( `' I " S ) =/= (/) ) ) -> ( I ` ( ( glb ` K ) ` ( `' I " S ) ) ) = \|^\|_ y e. ( `' I " S ) ( I ` y ) )
55	24 26 52 54	syl12anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( I ` ( ( glb ` K ) ` ( `' I " S ) ) ) = \|^\|_ y e. ( `' I " S ) ( I ` y ) )
56		fvres	\|- ( y e. ( `' I " S ) -> ( ( I \|` ( `' I " S ) ) ` y ) = ( I ` y ) )
57	56	iineq2i	\|- \|^\|_ y e. ( `' I " S ) ( ( I \|` ( `' I " S ) ) ` y ) = \|^\|_ y e. ( `' I " S ) ( I ` y )
58	55 57	eqtr4di	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( I ` ( ( glb ` K ) ` ( `' I " S ) ) ) = \|^\|_ y e. ( `' I " S ) ( ( I \|` ( `' I " S ) ) ` y ) )
59		hlclat	\|- ( K e. HL -> K e. CLat )
60	59	ad2antrr	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> K e. CLat )
61	3 53	clatglbcl	\|- ( ( K e. CLat /\ ( `' I " S ) C_ ( Base ` K ) ) -> ( ( glb ` K ) ` ( `' I " S ) ) e. ( Base ` K ) )
62	60 26 61	syl2anc	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( ( glb ` K ) ` ( `' I " S ) ) e. ( Base ` K ) )
63	3 1 2	dihcl	\|- ( ( ( K e. HL /\ W e. H ) /\ ( ( glb ` K ) ` ( `' I " S ) ) e. ( Base ` K ) ) -> ( I ` ( ( glb ` K ) ` ( `' I " S ) ) ) e. ran I )
64	62 63	syldan	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> ( I ` ( ( glb ` K ) ` ( `' I " S ) ) ) e. ran I )
65	58 64	eqeltrrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> \|^\|_ y e. ( `' I " S ) ( ( I \|` ( `' I " S ) ) ` y ) e. ran I )
66	23 65	eqeltrrd	\|- ( ( ( K e. HL /\ W e. H ) /\ ( S C_ ran I /\ S =/= (/) ) ) -> \|^\| S e. ran I )

Metamath Proof Explorer

Theorem dihintcl

Proof