mplmon

Description: A monomial is a polynomial. (Contributed by Mario Carneiro, 9-Jan-2015)

	Ref	Expression
Hypotheses	mplmon.s	$⊢ P = I mPoly R$
	mplmon.b	$⊢ B = {Base}_{P}$
	mplmon.z	$⊢ \underset{˙}{0} = 0_{R}$
	mplmon.o	$⊢ \underset{˙}{1} = 1_{R}$
	mplmon.d	$⊢ D = \{f \in ({ℕ_{0}}^{I}) \| f^{-1} [ℕ] \in Fin\}$
	mplmon.i	$⊢ φ \to I \in W$
	mplmon.r	$⊢ φ \to R \in Ring$
	mplmon.x	$⊢ φ \to X \in D$
Assertion	mplmon	$⊢ φ \to (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in B$

Proof

Step	Hyp	Ref	Expression
1		mplmon.s	$⊢ P = I mPoly R$
2		mplmon.b	$⊢ B = {Base}_{P}$
3		mplmon.z	$⊢ \underset{˙}{0} = 0_{R}$
4		mplmon.o	$⊢ \underset{˙}{1} = 1_{R}$
5		mplmon.d	$⊢ D = \{f \in ({ℕ_{0}}^{I}) \| f^{-1} [ℕ] \in Fin\}$
6		mplmon.i	$⊢ φ \to I \in W$
7		mplmon.r	$⊢ φ \to R \in Ring$
8		mplmon.x	$⊢ φ \to X \in D$
9		eqid	$⊢ {Base}_{R} = {Base}_{R}$
10	9 4	ringidcl	$⊢ R \in Ring \to \underset{˙}{1} \in {Base}_{R}$
11	9 3	ring0cl	$⊢ R \in Ring \to \underset{˙}{0} \in {Base}_{R}$
12	10 11	ifcld	$⊢ R \in Ring \to if (y = X, \underset{˙}{1}, \underset{˙}{0}) \in {Base}_{R}$
13	7 12	syl	$⊢ φ \to if (y = X, \underset{˙}{1}, \underset{˙}{0}) \in {Base}_{R}$
14	13	adantr	$⊢ (φ \land y \in D) \to if (y = X, \underset{˙}{1}, \underset{˙}{0}) \in {Base}_{R}$
15	14	fmpttd	$⊢ φ \to (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) : D ⟶ {Base}_{R}$
16		fvex	$⊢ {Base}_{R} \in V$
17		ovex	$⊢ {ℕ_{0}}^{I} \in V$
18	5 17	rabex2	$⊢ D \in V$
19	16 18	elmap	$⊢ (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in ({Base}_{R}^{D}) \leftrightarrow (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) : D ⟶ {Base}_{R}$
20	15 19	sylibr	$⊢ φ \to (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in ({Base}_{R}^{D})$
21		eqid	$⊢ I mPwSer R = I mPwSer R$
22		eqid	$⊢ {Base}_{(I mPwSer R)} = {Base}_{(I mPwSer R)}$
23	21 9 5 22 6	psrbas	$⊢ φ \to {Base}_{(I mPwSer R)} = {Base}_{R}^{D}$
24	20 23	eleqtrrd	$⊢ φ \to (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in {Base}_{(I mPwSer R)}$
25	18	mptex	$⊢ (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in V$
26		funmpt	$⊢ Fun (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0}))$
27	3	fvexi	$⊢ \underset{˙}{0} \in V$
28	25 26 27	3pm3.2i	$⊢ ((y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in V \land Fun (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \land \underset{˙}{0} \in V)$
29	28	a1i	$⊢ φ \to ((y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in V \land Fun (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \land \underset{˙}{0} \in V)$
30		snfi	$⊢ \{X\} \in Fin$
31	30	a1i	$⊢ φ \to \{X\} \in Fin$
32		eldifsni	$⊢ y \in (D ∖ \{X\}) \to y \neq X$
33	32	adantl	$⊢ (φ \land y \in (D ∖ \{X\})) \to y \neq X$
34	33	neneqd	$⊢ (φ \land y \in (D ∖ \{X\})) \to \neg y = X$
35	34	iffalsed	$⊢ (φ \land y \in (D ∖ \{X\})) \to if (y = X, \underset{˙}{1}, \underset{˙}{0}) = \underset{˙}{0}$
36	18	a1i	$⊢ φ \to D \in V$
37	35 36	suppss2	$⊢ φ \to (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) supp \underset{˙}{0} \subseteq \{X\}$
38		suppssfifsupp	$⊢ (((y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in V \land Fun (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \land \underset{˙}{0} \in V) \land (\{X\} \in Fin \land (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) supp \underset{˙}{0} \subseteq \{X\})) \to {finSupp}_{\underset{˙}{0}} ((y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})))$
39	29 31 37 38	syl12anc	$⊢ φ \to {finSupp}_{\underset{˙}{0}} ((y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})))$
40	1 21 22 3 2	mplelbas	$⊢ (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in B \leftrightarrow ((y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in {Base}_{(I mPwSer R)} \land {finSupp}_{\underset{˙}{0}} ((y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0}))))$
41	24 39 40	sylanbrc	$⊢ φ \to (y \in D ⟼ if (y = X, \underset{˙}{1}, \underset{˙}{0})) \in B$

Metamath Proof Explorer

Theorem mplmon

Proof