pf1subrg

Description: Polynomial functions are a subring. (Contributed by Mario Carneiro, 19-Mar-2015) (Revised by Mario Carneiro, 6-May-2015)

	Ref	Expression
Hypotheses	pf1const.b	\|- B = ( Base ` R )
	pf1const.q	\|- Q = ran ( eval1 ` R )
Assertion	pf1subrg	\|- ( R e. CRing -> Q e. ( SubRing ` ( R ^s B ) ) )

Proof

Step	Hyp	Ref	Expression
1		pf1const.b	\|- B = ( Base ` R )
2		pf1const.q	\|- Q = ran ( eval1 ` R )
3		eqid	\|- ( eval1 ` R ) = ( eval1 ` R )
4		eqid	\|- ( Poly1 ` R ) = ( Poly1 ` R )
5		eqid	\|- ( R ^s B ) = ( R ^s B )
6	3 4 5 1	evl1rhm	\|- ( R e. CRing -> ( eval1 ` R ) e. ( ( Poly1 ` R ) RingHom ( R ^s B ) ) )
7		eqid	\|- ( Base ` ( Poly1 ` R ) ) = ( Base ` ( Poly1 ` R ) )
8		eqid	\|- ( Base ` ( R ^s B ) ) = ( Base ` ( R ^s B ) )
9	7 8	rhmf	\|- ( ( eval1 ` R ) e. ( ( Poly1 ` R ) RingHom ( R ^s B ) ) -> ( eval1 ` R ) : ( Base ` ( Poly1 ` R ) ) --> ( Base ` ( R ^s B ) ) )
10		ffn	\|- ( ( eval1 ` R ) : ( Base ` ( Poly1 ` R ) ) --> ( Base ` ( R ^s B ) ) -> ( eval1 ` R ) Fn ( Base ` ( Poly1 ` R ) ) )
11		fnima	\|- ( ( eval1 ` R ) Fn ( Base ` ( Poly1 ` R ) ) -> ( ( eval1 ` R ) " ( Base ` ( Poly1 ` R ) ) ) = ran ( eval1 ` R ) )
12	6 9 10 11	4syl	\|- ( R e. CRing -> ( ( eval1 ` R ) " ( Base ` ( Poly1 ` R ) ) ) = ran ( eval1 ` R ) )
13	12 2	eqtr4di	\|- ( R e. CRing -> ( ( eval1 ` R ) " ( Base ` ( Poly1 ` R ) ) ) = Q )
14	4	ply1assa	\|- ( R e. CRing -> ( Poly1 ` R ) e. AssAlg )
15		assaring	\|- ( ( Poly1 ` R ) e. AssAlg -> ( Poly1 ` R ) e. Ring )
16	7	subrgid	\|- ( ( Poly1 ` R ) e. Ring -> ( Base ` ( Poly1 ` R ) ) e. ( SubRing ` ( Poly1 ` R ) ) )
17	14 15 16	3syl	\|- ( R e. CRing -> ( Base ` ( Poly1 ` R ) ) e. ( SubRing ` ( Poly1 ` R ) ) )
18		rhmima	\|- ( ( ( eval1 ` R ) e. ( ( Poly1 ` R ) RingHom ( R ^s B ) ) /\ ( Base ` ( Poly1 ` R ) ) e. ( SubRing ` ( Poly1 ` R ) ) ) -> ( ( eval1 ` R ) " ( Base ` ( Poly1 ` R ) ) ) e. ( SubRing ` ( R ^s B ) ) )
19	6 17 18	syl2anc	\|- ( R e. CRing -> ( ( eval1 ` R ) " ( Base ` ( Poly1 ` R ) ) ) e. ( SubRing ` ( R ^s B ) ) )
20	13 19	eqeltrrd	\|- ( R e. CRing -> Q e. ( SubRing ` ( R ^s B ) ) )

Metamath Proof Explorer

Theorem pf1subrg

Proof