odfval

Description: Value of the order function. For a shorter proof using ax-rep , see odfvalALT . (Contributed by Mario Carneiro, 13-Jul-2014) (Revised by AV, 5-Oct-2020) Remove depedency on ax-rep . (Revised by Rohan Ridenour, 17-Aug-2023)

	Ref	Expression
Hypotheses	odval.1	\|- X = ( Base ` G )
	odval.2	\|- .x. = ( .g ` G )
	odval.3	\|- .0. = ( 0g ` G )
	odval.4	\|- O = ( od ` G )
Assertion	odfval	\|- O = ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) )

Proof

Step	Hyp	Ref	Expression
1		odval.1	\|- X = ( Base ` G )
2		odval.2	\|- .x. = ( .g ` G )
3		odval.3	\|- .0. = ( 0g ` G )
4		odval.4	\|- O = ( od ` G )
5		fveq2	\|- ( g = G -> ( Base ` g ) = ( Base ` G ) )
6	5 1	eqtr4di	\|- ( g = G -> ( Base ` g ) = X )
7		fveq2	\|- ( g = G -> ( .g ` g ) = ( .g ` G ) )
8	7 2	eqtr4di	\|- ( g = G -> ( .g ` g ) = .x. )
9	8	oveqd	\|- ( g = G -> ( y ( .g ` g ) x ) = ( y .x. x ) )
10		fveq2	\|- ( g = G -> ( 0g ` g ) = ( 0g ` G ) )
11	10 3	eqtr4di	\|- ( g = G -> ( 0g ` g ) = .0. )
12	9 11	eqeq12d	\|- ( g = G -> ( ( y ( .g ` g ) x ) = ( 0g ` g ) <-> ( y .x. x ) = .0. ) )
13	12	rabbidv	\|- ( g = G -> { y e. NN \| ( y ( .g ` g ) x ) = ( 0g ` g ) } = { y e. NN \| ( y .x. x ) = .0. } )
14	13	csbeq1d	\|- ( g = G -> [_ { y e. NN \| ( y ( .g ` g ) x ) = ( 0g ` g ) } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) = [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) )
15	6 14	mpteq12dv	\|- ( g = G -> ( x e. ( Base ` g ) \|-> [_ { y e. NN \| ( y ( .g ` g ) x ) = ( 0g ` g ) } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) = ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) )
16		df-od	\|- od = ( g e. _V \|-> ( x e. ( Base ` g ) \|-> [_ { y e. NN \| ( y ( .g ` g ) x ) = ( 0g ` g ) } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) )
17	1	fvexi	\|- X e. _V
18		nn0ex	\|- NN0 e. _V
19		nnex	\|- NN e. _V
20	19	rabex	\|- { y e. NN \| ( y .x. x ) = .0. } e. _V
21		eqeq1	\|- ( i = { y e. NN \| ( y .x. x ) = .0. } -> ( i = (/) <-> { y e. NN \| ( y .x. x ) = .0. } = (/) ) )
22		infeq1	\|- ( i = { y e. NN \| ( y .x. x ) = .0. } -> inf ( i , RR , < ) = inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) )
23	21 22	ifbieq2d	\|- ( i = { y e. NN \| ( y .x. x ) = .0. } -> if ( i = (/) , 0 , inf ( i , RR , < ) ) = if ( { y e. NN \| ( y .x. x ) = .0. } = (/) , 0 , inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) ) )
24	20 23	csbie	\|- [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) = if ( { y e. NN \| ( y .x. x ) = .0. } = (/) , 0 , inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) )
25		0nn0	\|- 0 e. NN0
26	25	a1i	\|- ( ( T. /\ { y e. NN \| ( y .x. x ) = .0. } = (/) ) -> 0 e. NN0 )
27		df-ne	\|- ( { y e. NN \| ( y .x. x ) = .0. } =/= (/) <-> -. { y e. NN \| ( y .x. x ) = .0. } = (/) )
28		ssrab2	\|- { y e. NN \| ( y .x. x ) = .0. } C_ NN
29		nnuz	\|- NN = ( ZZ>= ` 1 )
30	28 29	sseqtri	\|- { y e. NN \| ( y .x. x ) = .0. } C_ ( ZZ>= ` 1 )
31		infssuzcl	\|- ( ( { y e. NN \| ( y .x. x ) = .0. } C_ ( ZZ>= ` 1 ) /\ { y e. NN \| ( y .x. x ) = .0. } =/= (/) ) -> inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) e. { y e. NN \| ( y .x. x ) = .0. } )
32	30 31	mpan	\|- ( { y e. NN \| ( y .x. x ) = .0. } =/= (/) -> inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) e. { y e. NN \| ( y .x. x ) = .0. } )
33	28 32	sseldi	\|- ( { y e. NN \| ( y .x. x ) = .0. } =/= (/) -> inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) e. NN )
34	27 33	sylbir	\|- ( -. { y e. NN \| ( y .x. x ) = .0. } = (/) -> inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) e. NN )
35	34	nnnn0d	\|- ( -. { y e. NN \| ( y .x. x ) = .0. } = (/) -> inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) e. NN0 )
36	35	adantl	\|- ( ( T. /\ -. { y e. NN \| ( y .x. x ) = .0. } = (/) ) -> inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) e. NN0 )
37	26 36	ifclda	\|- ( T. -> if ( { y e. NN \| ( y .x. x ) = .0. } = (/) , 0 , inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) ) e. NN0 )
38	37	mptru	\|- if ( { y e. NN \| ( y .x. x ) = .0. } = (/) , 0 , inf ( { y e. NN \| ( y .x. x ) = .0. } , RR , < ) ) e. NN0
39	24 38	eqeltri	\|- [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) e. NN0
40	39	rgenw	\|- A. x e. X [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) e. NN0
41	17 18 40	mptexw	\|- ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) e. _V
42	15 16 41	fvmpt	\|- ( G e. _V -> ( od ` G ) = ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) )
43		fvprc	\|- ( -. G e. _V -> ( od ` G ) = (/) )
44		fvprc	\|- ( -. G e. _V -> ( Base ` G ) = (/) )
45	1 44	syl5eq	\|- ( -. G e. _V -> X = (/) )
46	45	mpteq1d	\|- ( -. G e. _V -> ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) = ( x e. (/) \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) )
47		mpt0	\|- ( x e. (/) \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) = (/)
48	46 47	eqtrdi	\|- ( -. G e. _V -> ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) = (/) )
49	43 48	eqtr4d	\|- ( -. G e. _V -> ( od ` G ) = ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) ) )
50	42 49	pm2.61i	\|- ( od ` G ) = ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) )
51	4 50	eqtri	\|- O = ( x e. X \|-> [_ { y e. NN \| ( y .x. x ) = .0. } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) )

Metamath Proof Explorer

Theorem odfval

Proof