frgpup2

Description: The evaluation map has the intended behavior on the generators. (Contributed by Mario Carneiro, 2-Oct-2015) (Revised by Mario Carneiro, 28-Feb-2016)

	Ref	Expression
Hypotheses	frgpup.b	$⊢ B = {Base}_{H}$
	frgpup.n	$⊢ N = {inv}_{g} (H)$
	frgpup.t	$⊢ T = (y \in I, z \in 2_{𝑜} ⟼ if (z = \emptyset, F (y), N (F (y))))$
	frgpup.h	$⊢ φ \to H \in Grp$
	frgpup.i	$⊢ φ \to I \in V$
	frgpup.a	$⊢ φ \to F : I ⟶ B$
	frgpup.w	$⊢ W = I (Word (I \times 2_{𝑜}))$
	frgpup.r	$⊢ \underset{˙}{\sim} = ~_{FG} (I)$
	frgpup.g	$⊢ G = freeGrp (I)$
	frgpup.x	$⊢ X = {Base}_{G}$
	frgpup.e	$⊢ E = ran (g \in W ⟼ ⟨[g] \underset{˙}{\sim}, \sum_{H} (T \circ g)⟩)$
	frgpup.u	$⊢ U = {var}_{FGrp} (I)$
	frgpup.y	$⊢ φ \to A \in I$
Assertion	frgpup2	$⊢ φ \to E (U (A)) = F (A)$

Proof

Step	Hyp	Ref	Expression
1		frgpup.b	$⊢ B = {Base}_{H}$
2		frgpup.n	$⊢ N = {inv}_{g} (H)$
3		frgpup.t	$⊢ T = (y \in I, z \in 2_{𝑜} ⟼ if (z = \emptyset, F (y), N (F (y))))$
4		frgpup.h	$⊢ φ \to H \in Grp$
5		frgpup.i	$⊢ φ \to I \in V$
6		frgpup.a	$⊢ φ \to F : I ⟶ B$
7		frgpup.w	$⊢ W = I (Word (I \times 2_{𝑜}))$
8		frgpup.r	$⊢ \underset{˙}{\sim} = ~_{FG} (I)$
9		frgpup.g	$⊢ G = freeGrp (I)$
10		frgpup.x	$⊢ X = {Base}_{G}$
11		frgpup.e	$⊢ E = ran (g \in W ⟼ ⟨[g] \underset{˙}{\sim}, \sum_{H} (T \circ g)⟩)$
12		frgpup.u	$⊢ U = {var}_{FGrp} (I)$
13		frgpup.y	$⊢ φ \to A \in I$
14	8 12	vrgpval	$⊢ (I \in V \land A \in I) \to U (A) = [⟨“ ⟨A, \emptyset⟩ ”⟩] \underset{˙}{\sim}$
15	5 13 14	syl2anc	$⊢ φ \to U (A) = [⟨“ ⟨A, \emptyset⟩ ”⟩] \underset{˙}{\sim}$
16	15	fveq2d	$⊢ φ \to E (U (A)) = E ([⟨“ ⟨A, \emptyset⟩ ”⟩] \underset{˙}{\sim})$
17		0ex	$⊢ \emptyset \in V$
18	17	prid1	$⊢ \emptyset \in \{\emptyset, 1_{𝑜}\}$
19		df2o3	$⊢ 2_{𝑜} = \{\emptyset, 1_{𝑜}\}$
20	18 19	eleqtrri	$⊢ \emptyset \in 2_{𝑜}$
21		opelxpi	$⊢ (A \in I \land \emptyset \in 2_{𝑜}) \to ⟨A, \emptyset⟩ \in (I \times 2_{𝑜})$
22	13 20 21	sylancl	$⊢ φ \to ⟨A, \emptyset⟩ \in (I \times 2_{𝑜})$
23	22	s1cld	$⊢ φ \to ⟨“ ⟨A, \emptyset⟩ ”⟩ \in Word (I \times 2_{𝑜})$
24		2on	$⊢ 2_{𝑜} \in On$
25		xpexg	$⊢ (I \in V \land 2_{𝑜} \in On) \to I \times 2_{𝑜} \in V$
26	5 24 25	sylancl	$⊢ φ \to I \times 2_{𝑜} \in V$
27		wrdexg	$⊢ I \times 2_{𝑜} \in V \to Word (I \times 2_{𝑜}) \in V$
28		fvi	$⊢ Word (I \times 2_{𝑜}) \in V \to I (Word (I \times 2_{𝑜})) = Word (I \times 2_{𝑜})$
29	26 27 28	3syl	$⊢ φ \to I (Word (I \times 2_{𝑜})) = Word (I \times 2_{𝑜})$
30	7 29	eqtrid	$⊢ φ \to W = Word (I \times 2_{𝑜})$
31	23 30	eleqtrrd	$⊢ φ \to ⟨“ ⟨A, \emptyset⟩ ”⟩ \in W$
32	1 2 3 4 5 6 7 8 9 10 11	frgpupval	$⊢ (φ \land ⟨“ ⟨A, \emptyset⟩ ”⟩ \in W) \to E ([⟨“ ⟨A, \emptyset⟩ ”⟩] \underset{˙}{\sim}) = \sum_{H} (T \circ ⟨“ ⟨A, \emptyset⟩ ”⟩)$
33	31 32	mpdan	$⊢ φ \to E ([⟨“ ⟨A, \emptyset⟩ ”⟩] \underset{˙}{\sim}) = \sum_{H} (T \circ ⟨“ ⟨A, \emptyset⟩ ”⟩)$
34	1 2 3 4 5 6	frgpuptf	$⊢ φ \to T : I \times 2_{𝑜} ⟶ B$
35		s1co	$⊢ (⟨A, \emptyset⟩ \in (I \times 2_{𝑜}) \land T : I \times 2_{𝑜} ⟶ B) \to T \circ ⟨“ ⟨A, \emptyset⟩ ”⟩ = ⟨“ T (⟨A, \emptyset⟩) ”⟩$
36	22 34 35	syl2anc	$⊢ φ \to T \circ ⟨“ ⟨A, \emptyset⟩ ”⟩ = ⟨“ T (⟨A, \emptyset⟩) ”⟩$
37		df-ov	$⊢ A T \emptyset = T (⟨A, \emptyset⟩)$
38		iftrue	$⊢ z = \emptyset \to if (z = \emptyset, F (y), N (F (y))) = F (y)$
39		fveq2	$⊢ y = A \to F (y) = F (A)$
40	38 39	sylan9eqr	$⊢ (y = A \land z = \emptyset) \to if (z = \emptyset, F (y), N (F (y))) = F (A)$
41		fvex	$⊢ F (A) \in V$
42	40 3 41	ovmpoa	$⊢ (A \in I \land \emptyset \in 2_{𝑜}) \to A T \emptyset = F (A)$
43	13 20 42	sylancl	$⊢ φ \to A T \emptyset = F (A)$
44	37 43	eqtr3id	$⊢ φ \to T (⟨A, \emptyset⟩) = F (A)$
45	44	s1eqd	$⊢ φ \to ⟨“ T (⟨A, \emptyset⟩) ”⟩ = ⟨“ F (A) ”⟩$
46	36 45	eqtrd	$⊢ φ \to T \circ ⟨“ ⟨A, \emptyset⟩ ”⟩ = ⟨“ F (A) ”⟩$
47	46	oveq2d	$⊢ φ \to \sum_{H} (T \circ ⟨“ ⟨A, \emptyset⟩ ”⟩) = \sum_{H} ⟨“ F (A) ”⟩$
48	6 13	ffvelrnd	$⊢ φ \to F (A) \in B$
49	1	gsumws1	$⊢ F (A) \in B \to \sum_{H} ⟨“ F (A) ”⟩ = F (A)$
50	48 49	syl	$⊢ φ \to \sum_{H} ⟨“ F (A) ”⟩ = F (A)$
51	47 50	eqtrd	$⊢ φ \to \sum_{H} (T \circ ⟨“ ⟨A, \emptyset⟩ ”⟩) = F (A)$
52	16 33 51	3eqtrd	$⊢ φ \to E (U (A)) = F (A)$

Metamath Proof Explorer

Theorem frgpup2

Proof