df-dic

Description: Isomorphism C has domain of lattice atoms that are not less than or equal to the fiducial co-atom w . The value is a one-dimensional subspace generated by the pair consisting of the iota_ vector below and the endomorphism ring unity. Definition of phi(q) in Crawley p. 121. Note that we use the fixed atom ( ( oc k ) w ) to represent the p in their "Choose an atom p..." on line 21. (Contributed by NM, 15-Dec-2013)

		Ref	Expression
	Assertion	df-dic	\|- DIsoC = ( k e. _V \|-> ( w e. ( LHyp ` k ) \|-> ( q e. { r e. ( Atoms ` k ) \| -. r ( le ` k ) w } \|-> { <. f , s >. \| ( f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) ) /\ s e. ( ( TEndo ` k ) ` w ) ) } ) ) )

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cdic	\|- DIsoC
1		vk	\|- k
2		cvv	\|- _V
3		vw	\|- w
4		clh	\|- LHyp
5	1	cv	\|- k
6	5 4	cfv	\|- ( LHyp ` k )
7		vq	\|- q
8		vr	\|- r
9		catm	\|- Atoms
10	5 9	cfv	\|- ( Atoms ` k )
11	8	cv	\|- r
12		cple	\|- le
13	5 12	cfv	\|- ( le ` k )
14	3	cv	\|- w
15	11 14 13	wbr	\|- r ( le ` k ) w
16	15	wn	\|- -. r ( le ` k ) w
17	16 8 10	crab	\|- { r e. ( Atoms ` k ) \| -. r ( le ` k ) w }
18		vf	\|- f
19		vs	\|- s
20	18	cv	\|- f
21	19	cv	\|- s
22		vg	\|- g
23		cltrn	\|- LTrn
24	5 23	cfv	\|- ( LTrn ` k )
25	14 24	cfv	\|- ( ( LTrn ` k ) ` w )
26	22	cv	\|- g
27		coc	\|- oc
28	5 27	cfv	\|- ( oc ` k )
29	14 28	cfv	\|- ( ( oc ` k ) ` w )
30	29 26	cfv	\|- ( g ` ( ( oc ` k ) ` w ) )
31	7	cv	\|- q
32	30 31	wceq	\|- ( g ` ( ( oc ` k ) ` w ) ) = q
33	32 22 25	crio	\|- ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q )
34	33 21	cfv	\|- ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) )
35	20 34	wceq	\|- f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) )
36		ctendo	\|- TEndo
37	5 36	cfv	\|- ( TEndo ` k )
38	14 37	cfv	\|- ( ( TEndo ` k ) ` w )
39	21 38	wcel	\|- s e. ( ( TEndo ` k ) ` w )
40	35 39	wa	\|- ( f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) ) /\ s e. ( ( TEndo ` k ) ` w ) )
41	40 18 19	copab	\|- { <. f , s >. \| ( f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) ) /\ s e. ( ( TEndo ` k ) ` w ) ) }
42	7 17 41	cmpt	\|- ( q e. { r e. ( Atoms ` k ) \| -. r ( le ` k ) w } \|-> { <. f , s >. \| ( f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) ) /\ s e. ( ( TEndo ` k ) ` w ) ) } )
43	3 6 42	cmpt	\|- ( w e. ( LHyp ` k ) \|-> ( q e. { r e. ( Atoms ` k ) \| -. r ( le ` k ) w } \|-> { <. f , s >. \| ( f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) ) /\ s e. ( ( TEndo ` k ) ` w ) ) } ) )
44	1 2 43	cmpt	\|- ( k e. _V \|-> ( w e. ( LHyp ` k ) \|-> ( q e. { r e. ( Atoms ` k ) \| -. r ( le ` k ) w } \|-> { <. f , s >. \| ( f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) ) /\ s e. ( ( TEndo ` k ) ` w ) ) } ) ) )
45	0 44	wceq	\|- DIsoC = ( k e. _V \|-> ( w e. ( LHyp ` k ) \|-> ( q e. { r e. ( Atoms ` k ) \| -. r ( le ` k ) w } \|-> { <. f , s >. \| ( f = ( s ` ( iota_ g e. ( ( LTrn ` k ) ` w ) ( g ` ( ( oc ` k ) ` w ) ) = q ) ) /\ s e. ( ( TEndo ` k ) ` w ) ) } ) ) )

Metamath Proof Explorer

Definition df-dic

Detailed syntax breakdown