Metamath Proof Explorer

Theorem catchomfval

Description: Set of arrows of the category of categories (in a universe). (Contributed by Mario Carneiro, 3-Jan-2017)

		Ref	Expression
	Hypotheses	catcbas.c	\|- C = ( CatCat ` U )
		catcbas.b	\|- B = ( Base ` C )
		catcbas.u	\|- ( ph -> U e. V )
		catchomfval.h	\|- H = ( Hom ` C )
	Assertion	catchomfval	\|- ( ph -> H = ( x e. B , y e. B \|-> ( x Func y ) ) )

Proof

Step	Hyp	Ref	Expression
1		catcbas.c	\|- C = ( CatCat ` U )
2		catcbas.b	\|- B = ( Base ` C )
3		catcbas.u	\|- ( ph -> U e. V )
4		catchomfval.h	\|- H = ( Hom ` C )
5	1 2 3	catcbas	\|- ( ph -> B = ( U i^i Cat ) )
6		eqidd	\|- ( ph -> ( x e. B , y e. B \|-> ( x Func y ) ) = ( x e. B , y e. B \|-> ( x Func y ) ) )
7		eqidd	\|- ( ph -> ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) = ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) )
8	1 3 5 6 7	catcval	\|- ( ph -> C = { <. ( Base ` ndx ) , B >. , <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. , <. ( comp ` ndx ) , ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) >. } )
9	8	fveq2d	\|- ( ph -> ( Hom ` C ) = ( Hom ` { <. ( Base ` ndx ) , B >. , <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. , <. ( comp ` ndx ) , ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) >. } ) )
10	4 9	syl5eq	\|- ( ph -> H = ( Hom ` { <. ( Base ` ndx ) , B >. , <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. , <. ( comp ` ndx ) , ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) >. } ) )
11	2	fvexi	\|- B e. _V
12	11 11	mpoex	\|- ( x e. B , y e. B \|-> ( x Func y ) ) e. _V
13		catstr	\|- { <. ( Base ` ndx ) , B >. , <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. , <. ( comp ` ndx ) , ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) >. } Struct <. 1 , ; 1 5 >.
14		homid	\|- Hom = Slot ( Hom ` ndx )
15		snsstp2	\|- { <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. } C_ { <. ( Base ` ndx ) , B >. , <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. , <. ( comp ` ndx ) , ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) >. }
16	13 14 15	strfv	\|- ( ( x e. B , y e. B \|-> ( x Func y ) ) e. _V -> ( x e. B , y e. B \|-> ( x Func y ) ) = ( Hom ` { <. ( Base ` ndx ) , B >. , <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. , <. ( comp ` ndx ) , ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) >. } ) )
17	12 16	mp1i	\|- ( ph -> ( x e. B , y e. B \|-> ( x Func y ) ) = ( Hom ` { <. ( Base ` ndx ) , B >. , <. ( Hom ` ndx ) , ( x e. B , y e. B \|-> ( x Func y ) ) >. , <. ( comp ` ndx ) , ( v e. ( B X. B ) , z e. B \|-> ( g e. ( ( 2nd ` v ) Func z ) , f e. ( Func ` v ) \|-> ( g o.func f ) ) ) >. } ) )
18	10 17	eqtr4d	\|- ( ph -> H = ( x e. B , y e. B \|-> ( x Func y ) ) )