evl1scvarpw

Description: Univariate polynomial evaluation maps a multiple of an exponentiation of a variable to the multiple of an exponentiation of the evaluated variable. (Contributed by AV, 18-Sep-2019)

	Ref	Expression
Hypotheses	evl1varpw.q	\|- Q = ( eval1 ` R )
	evl1varpw.w	\|- W = ( Poly1 ` R )
	evl1varpw.g	\|- G = ( mulGrp ` W )
	evl1varpw.x	\|- X = ( var1 ` R )
	evl1varpw.b	\|- B = ( Base ` R )
	evl1varpw.e	\|- .^ = ( .g ` G )
	evl1varpw.r	\|- ( ph -> R e. CRing )
	evl1varpw.n	\|- ( ph -> N e. NN0 )
	evl1scvarpw.t1	\|- .X. = ( .s ` W )
	evl1scvarpw.a	\|- ( ph -> A e. B )
	evl1scvarpw.s	\|- S = ( R ^s B )
	evl1scvarpw.t2	\|- .xb = ( .r ` S )
	evl1scvarpw.m	\|- M = ( mulGrp ` S )
	evl1scvarpw.f	\|- F = ( .g ` M )
Assertion	evl1scvarpw	\|- ( ph -> ( Q ` ( A .X. ( N .^ X ) ) ) = ( ( B X. { A } ) .xb ( N F ( Q ` X ) ) ) )

Proof

Step	Hyp	Ref	Expression
1		evl1varpw.q	\|- Q = ( eval1 ` R )
2		evl1varpw.w	\|- W = ( Poly1 ` R )
3		evl1varpw.g	\|- G = ( mulGrp ` W )
4		evl1varpw.x	\|- X = ( var1 ` R )
5		evl1varpw.b	\|- B = ( Base ` R )
6		evl1varpw.e	\|- .^ = ( .g ` G )
7		evl1varpw.r	\|- ( ph -> R e. CRing )
8		evl1varpw.n	\|- ( ph -> N e. NN0 )
9		evl1scvarpw.t1	\|- .X. = ( .s ` W )
10		evl1scvarpw.a	\|- ( ph -> A e. B )
11		evl1scvarpw.s	\|- S = ( R ^s B )
12		evl1scvarpw.t2	\|- .xb = ( .r ` S )
13		evl1scvarpw.m	\|- M = ( mulGrp ` S )
14		evl1scvarpw.f	\|- F = ( .g ` M )
15	2	ply1assa	\|- ( R e. CRing -> W e. AssAlg )
16	7 15	syl	\|- ( ph -> W e. AssAlg )
17	10 5	eleqtrdi	\|- ( ph -> A e. ( Base ` R ) )
18	2	ply1sca	\|- ( R e. CRing -> R = ( Scalar ` W ) )
19	18	eqcomd	\|- ( R e. CRing -> ( Scalar ` W ) = R )
20	7 19	syl	\|- ( ph -> ( Scalar ` W ) = R )
21	20	fveq2d	\|- ( ph -> ( Base ` ( Scalar ` W ) ) = ( Base ` R ) )
22	17 21	eleqtrrd	\|- ( ph -> A e. ( Base ` ( Scalar ` W ) ) )
23		eqid	\|- ( Base ` W ) = ( Base ` W )
24	3 23	mgpbas	\|- ( Base ` W ) = ( Base ` G )
25		crngring	\|- ( R e. CRing -> R e. Ring )
26	7 25	syl	\|- ( ph -> R e. Ring )
27	2	ply1ring	\|- ( R e. Ring -> W e. Ring )
28	26 27	syl	\|- ( ph -> W e. Ring )
29	3	ringmgp	\|- ( W e. Ring -> G e. Mnd )
30	28 29	syl	\|- ( ph -> G e. Mnd )
31	4 2 23	vr1cl	\|- ( R e. Ring -> X e. ( Base ` W ) )
32	26 31	syl	\|- ( ph -> X e. ( Base ` W ) )
33	24 6 30 8 32	mulgnn0cld	\|- ( ph -> ( N .^ X ) e. ( Base ` W ) )
34		eqid	\|- ( algSc ` W ) = ( algSc ` W )
35		eqid	\|- ( Scalar ` W ) = ( Scalar ` W )
36		eqid	\|- ( Base ` ( Scalar ` W ) ) = ( Base ` ( Scalar ` W ) )
37		eqid	\|- ( .r ` W ) = ( .r ` W )
38	34 35 36 23 37 9	asclmul1	\|- ( ( W e. AssAlg /\ A e. ( Base ` ( Scalar ` W ) ) /\ ( N .^ X ) e. ( Base ` W ) ) -> ( ( ( algSc ` W ) ` A ) ( .r ` W ) ( N .^ X ) ) = ( A .X. ( N .^ X ) ) )
39	16 22 33 38	syl3anc	\|- ( ph -> ( ( ( algSc ` W ) ` A ) ( .r ` W ) ( N .^ X ) ) = ( A .X. ( N .^ X ) ) )
40	39	eqcomd	\|- ( ph -> ( A .X. ( N .^ X ) ) = ( ( ( algSc ` W ) ` A ) ( .r ` W ) ( N .^ X ) ) )
41	40	fveq2d	\|- ( ph -> ( Q ` ( A .X. ( N .^ X ) ) ) = ( Q ` ( ( ( algSc ` W ) ` A ) ( .r ` W ) ( N .^ X ) ) ) )
42	1 2 11 5	evl1rhm	\|- ( R e. CRing -> Q e. ( W RingHom S ) )
43	7 42	syl	\|- ( ph -> Q e. ( W RingHom S ) )
44	2	ply1lmod	\|- ( R e. Ring -> W e. LMod )
45	26 44	syl	\|- ( ph -> W e. LMod )
46	34 35 28 45 36 23	asclf	\|- ( ph -> ( algSc ` W ) : ( Base ` ( Scalar ` W ) ) --> ( Base ` W ) )
47	46 22	ffvelcdmd	\|- ( ph -> ( ( algSc ` W ) ` A ) e. ( Base ` W ) )
48	23 37 12	rhmmul	\|- ( ( Q e. ( W RingHom S ) /\ ( ( algSc ` W ) ` A ) e. ( Base ` W ) /\ ( N .^ X ) e. ( Base ` W ) ) -> ( Q ` ( ( ( algSc ` W ) ` A ) ( .r ` W ) ( N .^ X ) ) ) = ( ( Q ` ( ( algSc ` W ) ` A ) ) .xb ( Q ` ( N .^ X ) ) ) )
49	43 47 33 48	syl3anc	\|- ( ph -> ( Q ` ( ( ( algSc ` W ) ` A ) ( .r ` W ) ( N .^ X ) ) ) = ( ( Q ` ( ( algSc ` W ) ` A ) ) .xb ( Q ` ( N .^ X ) ) ) )
50	1 2 5 34	evl1sca	\|- ( ( R e. CRing /\ A e. B ) -> ( Q ` ( ( algSc ` W ) ` A ) ) = ( B X. { A } ) )
51	7 10 50	syl2anc	\|- ( ph -> ( Q ` ( ( algSc ` W ) ` A ) ) = ( B X. { A } ) )
52	1 2 3 4 5 6 7 8	evl1varpw	\|- ( ph -> ( Q ` ( N .^ X ) ) = ( N ( .g ` ( mulGrp ` ( R ^s B ) ) ) ( Q ` X ) ) )
53	11	fveq2i	\|- ( mulGrp ` S ) = ( mulGrp ` ( R ^s B ) )
54	13 53	eqtri	\|- M = ( mulGrp ` ( R ^s B ) )
55	54	fveq2i	\|- ( .g ` M ) = ( .g ` ( mulGrp ` ( R ^s B ) ) )
56	14 55	eqtri	\|- F = ( .g ` ( mulGrp ` ( R ^s B ) ) )
57	56	a1i	\|- ( ph -> F = ( .g ` ( mulGrp ` ( R ^s B ) ) ) )
58	57	eqcomd	\|- ( ph -> ( .g ` ( mulGrp ` ( R ^s B ) ) ) = F )
59	58	oveqd	\|- ( ph -> ( N ( .g ` ( mulGrp ` ( R ^s B ) ) ) ( Q ` X ) ) = ( N F ( Q ` X ) ) )
60	52 59	eqtrd	\|- ( ph -> ( Q ` ( N .^ X ) ) = ( N F ( Q ` X ) ) )
61	51 60	oveq12d	\|- ( ph -> ( ( Q ` ( ( algSc ` W ) ` A ) ) .xb ( Q ` ( N .^ X ) ) ) = ( ( B X. { A } ) .xb ( N F ( Q ` X ) ) ) )
62	41 49 61	3eqtrd	\|- ( ph -> ( Q ` ( A .X. ( N .^ X ) ) ) = ( ( B X. { A } ) .xb ( N F ( Q ` X ) ) ) )

Metamath Proof Explorer

Theorem evl1scvarpw

Proof