erng1r

Description: The division ring unity of an endomorphism ring. (Contributed by NM, 5-Nov-2013) (Revised by Mario Carneiro, 23-Jun-2014)

	Ref	Expression
Hypotheses	erng1r.h	\|- H = ( LHyp ` K )
	erng1r.t	\|- T = ( ( LTrn ` K ) ` W )
	erng1r.d	\|- D = ( ( EDRing ` K ) ` W )
	erng1r.r	\|- .1. = ( 1r ` D )
Assertion	erng1r	\|- ( ( K e. HL /\ W e. H ) -> .1. = ( _I \|` T ) )

Proof

Step	Hyp	Ref	Expression
1		erng1r.h	\|- H = ( LHyp ` K )
2		erng1r.t	\|- T = ( ( LTrn ` K ) ` W )
3		erng1r.d	\|- D = ( ( EDRing ` K ) ` W )
4		erng1r.r	\|- .1. = ( 1r ` D )
5		eqid	\|- ( ( TEndo ` K ) ` W ) = ( ( TEndo ` K ) ` W )
6	1 2 5	tendoidcl	\|- ( ( K e. HL /\ W e. H ) -> ( _I \|` T ) e. ( ( TEndo ` K ) ` W ) )
7		eqid	\|- ( Base ` D ) = ( Base ` D )
8	1 2 5 3 7	erngbase	\|- ( ( K e. HL /\ W e. H ) -> ( Base ` D ) = ( ( TEndo ` K ) ` W ) )
9	6 8	eleqtrrd	\|- ( ( K e. HL /\ W e. H ) -> ( _I \|` T ) e. ( Base ` D ) )
10		eqid	\|- ( Base ` K ) = ( Base ` K )
11		eqid	\|- ( f e. T \|-> ( _I \|` ( Base ` K ) ) ) = ( f e. T \|-> ( _I \|` ( Base ` K ) ) )
12	10 1 2 5 11	tendo1ne0	\|- ( ( K e. HL /\ W e. H ) -> ( _I \|` T ) =/= ( f e. T \|-> ( _I \|` ( Base ` K ) ) ) )
13		eqid	\|- ( 0g ` D ) = ( 0g ` D )
14	10 1 2 3 11 13	erng0g	\|- ( ( K e. HL /\ W e. H ) -> ( 0g ` D ) = ( f e. T \|-> ( _I \|` ( Base ` K ) ) ) )
15	12 14	neeqtrrd	\|- ( ( K e. HL /\ W e. H ) -> ( _I \|` T ) =/= ( 0g ` D ) )
16		id	\|- ( ( K e. HL /\ W e. H ) -> ( K e. HL /\ W e. H ) )
17		eqid	\|- ( .r ` D ) = ( .r ` D )
18	1 2 5 3 17	erngmul	\|- ( ( ( K e. HL /\ W e. H ) /\ ( ( _I \|` T ) e. ( ( TEndo ` K ) ` W ) /\ ( _I \|` T ) e. ( ( TEndo ` K ) ` W ) ) ) -> ( ( _I \|` T ) ( .r ` D ) ( _I \|` T ) ) = ( ( _I \|` T ) o. ( _I \|` T ) ) )
19	16 6 6 18	syl12anc	\|- ( ( K e. HL /\ W e. H ) -> ( ( _I \|` T ) ( .r ` D ) ( _I \|` T ) ) = ( ( _I \|` T ) o. ( _I \|` T ) ) )
20		f1oi	\|- ( _I \|` T ) : T -1-1-onto-> T
21		f1of	\|- ( ( _I \|` T ) : T -1-1-onto-> T -> ( _I \|` T ) : T --> T )
22		fcoi2	\|- ( ( _I \|` T ) : T --> T -> ( ( _I \|` T ) o. ( _I \|` T ) ) = ( _I \|` T ) )
23	20 21 22	mp2b	\|- ( ( _I \|` T ) o. ( _I \|` T ) ) = ( _I \|` T )
24	19 23	eqtrdi	\|- ( ( K e. HL /\ W e. H ) -> ( ( _I \|` T ) ( .r ` D ) ( _I \|` T ) ) = ( _I \|` T ) )
25	9 15 24	3jca	\|- ( ( K e. HL /\ W e. H ) -> ( ( _I \|` T ) e. ( Base ` D ) /\ ( _I \|` T ) =/= ( 0g ` D ) /\ ( ( _I \|` T ) ( .r ` D ) ( _I \|` T ) ) = ( _I \|` T ) ) )
26	1 3	erngdv	\|- ( ( K e. HL /\ W e. H ) -> D e. DivRing )
27	7 17 13 4	drngid2	\|- ( D e. DivRing -> ( ( ( _I \|` T ) e. ( Base ` D ) /\ ( _I \|` T ) =/= ( 0g ` D ) /\ ( ( _I \|` T ) ( .r ` D ) ( _I \|` T ) ) = ( _I \|` T ) ) <-> .1. = ( _I \|` T ) ) )
28	26 27	syl	\|- ( ( K e. HL /\ W e. H ) -> ( ( ( _I \|` T ) e. ( Base ` D ) /\ ( _I \|` T ) =/= ( 0g ` D ) /\ ( ( _I \|` T ) ( .r ` D ) ( _I \|` T ) ) = ( _I \|` T ) ) <-> .1. = ( _I \|` T ) ) )
29	25 28	mpbid	\|- ( ( K e. HL /\ W e. H ) -> .1. = ( _I \|` T ) )

Metamath Proof Explorer

Theorem erng1r

Proof