dchrghm

Description: A Dirichlet character restricted to the unit group of Z/nZ is a group homomorphism into the multiplicative group of nonzero complex numbers. (Contributed by Mario Carneiro, 21-Apr-2016)

	Ref	Expression
Hypotheses	dchrghm.g	\|- G = ( DChr ` N )
	dchrghm.z	\|- Z = ( Z/nZ ` N )
	dchrghm.b	\|- D = ( Base ` G )
	dchrghm.u	\|- U = ( Unit ` Z )
	dchrghm.h	\|- H = ( ( mulGrp ` Z ) \|`s U )
	dchrghm.m	\|- M = ( ( mulGrp ` CCfld ) \|`s ( CC \ { 0 } ) )
	dchrghm.x	\|- ( ph -> X e. D )
Assertion	dchrghm	\|- ( ph -> ( X \|` U ) e. ( H GrpHom M ) )

Proof

Step	Hyp	Ref	Expression
1		dchrghm.g	\|- G = ( DChr ` N )
2		dchrghm.z	\|- Z = ( Z/nZ ` N )
3		dchrghm.b	\|- D = ( Base ` G )
4		dchrghm.u	\|- U = ( Unit ` Z )
5		dchrghm.h	\|- H = ( ( mulGrp ` Z ) \|`s U )
6		dchrghm.m	\|- M = ( ( mulGrp ` CCfld ) \|`s ( CC \ { 0 } ) )
7		dchrghm.x	\|- ( ph -> X e. D )
8	1 2 3	dchrmhm	\|- D C_ ( ( mulGrp ` Z ) MndHom ( mulGrp ` CCfld ) )
9	8 7	sselid	\|- ( ph -> X e. ( ( mulGrp ` Z ) MndHom ( mulGrp ` CCfld ) ) )
10	1 3	dchrrcl	\|- ( X e. D -> N e. NN )
11	7 10	syl	\|- ( ph -> N e. NN )
12	11	nnnn0d	\|- ( ph -> N e. NN0 )
13	2	zncrng	\|- ( N e. NN0 -> Z e. CRing )
14	12 13	syl	\|- ( ph -> Z e. CRing )
15		crngring	\|- ( Z e. CRing -> Z e. Ring )
16	14 15	syl	\|- ( ph -> Z e. Ring )
17		eqid	\|- ( mulGrp ` Z ) = ( mulGrp ` Z )
18	4 17	unitsubm	\|- ( Z e. Ring -> U e. ( SubMnd ` ( mulGrp ` Z ) ) )
19	16 18	syl	\|- ( ph -> U e. ( SubMnd ` ( mulGrp ` Z ) ) )
20	5	resmhm	\|- ( ( X e. ( ( mulGrp ` Z ) MndHom ( mulGrp ` CCfld ) ) /\ U e. ( SubMnd ` ( mulGrp ` Z ) ) ) -> ( X \|` U ) e. ( H MndHom ( mulGrp ` CCfld ) ) )
21	9 19 20	syl2anc	\|- ( ph -> ( X \|` U ) e. ( H MndHom ( mulGrp ` CCfld ) ) )
22		cnring	\|- CCfld e. Ring
23		cnfldbas	\|- CC = ( Base ` CCfld )
24		cnfld0	\|- 0 = ( 0g ` CCfld )
25		cndrng	\|- CCfld e. DivRing
26	23 24 25	drngui	\|- ( CC \ { 0 } ) = ( Unit ` CCfld )
27		eqid	\|- ( mulGrp ` CCfld ) = ( mulGrp ` CCfld )
28	26 27	unitsubm	\|- ( CCfld e. Ring -> ( CC \ { 0 } ) e. ( SubMnd ` ( mulGrp ` CCfld ) ) )
29	22 28	ax-mp	\|- ( CC \ { 0 } ) e. ( SubMnd ` ( mulGrp ` CCfld ) )
30		df-ima	\|- ( X " U ) = ran ( X \|` U )
31		eqid	\|- ( Base ` Z ) = ( Base ` Z )
32	1 2 3 31 7	dchrf	\|- ( ph -> X : ( Base ` Z ) --> CC )
33	31 4	unitss	\|- U C_ ( Base ` Z )
34	33	sseli	\|- ( x e. U -> x e. ( Base ` Z ) )
35		ffvelcdm	\|- ( ( X : ( Base ` Z ) --> CC /\ x e. ( Base ` Z ) ) -> ( X ` x ) e. CC )
36	32 34 35	syl2an	\|- ( ( ph /\ x e. U ) -> ( X ` x ) e. CC )
37		simpr	\|- ( ( ph /\ x e. U ) -> x e. U )
38	7	adantr	\|- ( ( ph /\ x e. U ) -> X e. D )
39	34	adantl	\|- ( ( ph /\ x e. U ) -> x e. ( Base ` Z ) )
40	1 2 3 31 4 38 39	dchrn0	\|- ( ( ph /\ x e. U ) -> ( ( X ` x ) =/= 0 <-> x e. U ) )
41	37 40	mpbird	\|- ( ( ph /\ x e. U ) -> ( X ` x ) =/= 0 )
42		eldifsn	\|- ( ( X ` x ) e. ( CC \ { 0 } ) <-> ( ( X ` x ) e. CC /\ ( X ` x ) =/= 0 ) )
43	36 41 42	sylanbrc	\|- ( ( ph /\ x e. U ) -> ( X ` x ) e. ( CC \ { 0 } ) )
44	43	ralrimiva	\|- ( ph -> A. x e. U ( X ` x ) e. ( CC \ { 0 } ) )
45	32	ffund	\|- ( ph -> Fun X )
46	32	fdmd	\|- ( ph -> dom X = ( Base ` Z ) )
47	33 46	sseqtrrid	\|- ( ph -> U C_ dom X )
48		funimass4	\|- ( ( Fun X /\ U C_ dom X ) -> ( ( X " U ) C_ ( CC \ { 0 } ) <-> A. x e. U ( X ` x ) e. ( CC \ { 0 } ) ) )
49	45 47 48	syl2anc	\|- ( ph -> ( ( X " U ) C_ ( CC \ { 0 } ) <-> A. x e. U ( X ` x ) e. ( CC \ { 0 } ) ) )
50	44 49	mpbird	\|- ( ph -> ( X " U ) C_ ( CC \ { 0 } ) )
51	30 50	eqsstrrid	\|- ( ph -> ran ( X \|` U ) C_ ( CC \ { 0 } ) )
52	6	resmhm2b	\|- ( ( ( CC \ { 0 } ) e. ( SubMnd ` ( mulGrp ` CCfld ) ) /\ ran ( X \|` U ) C_ ( CC \ { 0 } ) ) -> ( ( X \|` U ) e. ( H MndHom ( mulGrp ` CCfld ) ) <-> ( X \|` U ) e. ( H MndHom M ) ) )
53	29 51 52	sylancr	\|- ( ph -> ( ( X \|` U ) e. ( H MndHom ( mulGrp ` CCfld ) ) <-> ( X \|` U ) e. ( H MndHom M ) ) )
54	21 53	mpbid	\|- ( ph -> ( X \|` U ) e. ( H MndHom M ) )
55	4 5	unitgrp	\|- ( Z e. Ring -> H e. Grp )
56	16 55	syl	\|- ( ph -> H e. Grp )
57	6	cnmgpabl	\|- M e. Abel
58		ablgrp	\|- ( M e. Abel -> M e. Grp )
59	57 58	ax-mp	\|- M e. Grp
60		ghmmhmb	\|- ( ( H e. Grp /\ M e. Grp ) -> ( H GrpHom M ) = ( H MndHom M ) )
61	56 59 60	sylancl	\|- ( ph -> ( H GrpHom M ) = ( H MndHom M ) )
62	54 61	eleqtrrd	\|- ( ph -> ( X \|` U ) e. ( H GrpHom M ) )

Metamath Proof Explorer

Theorem dchrghm

Proof