df-gex

Description: Define the exponent of a group. (Contributed by Mario Carneiro, 13-Jul-2014) (Revised by Stefan O'Rear, 4-Sep-2015) (Revised by AV, 26-Sep-2020)

		Ref	Expression
	Assertion	df-gex	\|- gEx = ( g e. _V \|-> [_ { n e. NN \| A. x e. ( Base ` g ) ( n ( .g ` g ) x ) = ( 0g ` g ) } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) )

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cgex	\|- gEx
1		vg	\|- g
2		cvv	\|- _V
3		vn	\|- n
4		cn	\|- NN
5		vx	\|- x
6		cbs	\|- Base
7	1	cv	\|- g
8	7 6	cfv	\|- ( Base ` g )
9	3	cv	\|- n
10		cmg	\|- .g
11	7 10	cfv	\|- ( .g ` g )
12	5	cv	\|- x
13	9 12 11	co	\|- ( n ( .g ` g ) x )
14		c0g	\|- 0g
15	7 14	cfv	\|- ( 0g ` g )
16	13 15	wceq	\|- ( n ( .g ` g ) x ) = ( 0g ` g )
17	16 5 8	wral	\|- A. x e. ( Base ` g ) ( n ( .g ` g ) x ) = ( 0g ` g )
18	17 3 4	crab	\|- { n e. NN \| A. x e. ( Base ` g ) ( n ( .g ` g ) x ) = ( 0g ` g ) }
19		vi	\|- i
20	19	cv	\|- i
21		c0	\|- (/)
22	20 21	wceq	\|- i = (/)
23		cc0	\|- 0
24		cr	\|- RR
25		clt	\|- <
26	20 24 25	cinf	\|- inf ( i , RR , < )
27	22 23 26	cif	\|- if ( i = (/) , 0 , inf ( i , RR , < ) )
28	19 18 27	csb	\|- [_ { n e. NN \| A. x e. ( Base ` g ) ( n ( .g ` g ) x ) = ( 0g ` g ) } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) )
29	1 2 28	cmpt	\|- ( g e. _V \|-> [_ { n e. NN \| A. x e. ( Base ` g ) ( n ( .g ` g ) x ) = ( 0g ` g ) } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) )
30	0 29	wceq	\|- gEx = ( g e. _V \|-> [_ { n e. NN \| A. x e. ( Base ` g ) ( n ( .g ` g ) x ) = ( 0g ` g ) } / i ]_ if ( i = (/) , 0 , inf ( i , RR , < ) ) )

Metamath Proof Explorer

Definition df-gex

Detailed syntax breakdown