efgsf

Description: Value of the auxiliary function S defining a sequence of extensions starting at some irreducible word. (Contributed by Mario Carneiro, 1-Oct-2015)

	Ref	Expression
Hypotheses	efgval.w	$⊢ W = I (Word (I \times 2_{𝑜}))$
	efgval.r	$⊢ \underset{˙}{\sim} = ~_{FG} (I)$
	efgval2.m	$⊢ M = (y \in I, z \in 2_{𝑜} ⟼ ⟨y, 1_{𝑜} ∖ z⟩)$
	efgval2.t	$⊢ T = (v \in W ⟼ (n \in (0 \dots \|v\|), w \in (I \times 2_{𝑜}) ⟼ v splice ⟨n, n, ⟨“ w M (w) ”⟩⟩))$
	efgred.d	$⊢ D = W ∖ ⋃_{x \in W} ran T (x)$
	efgred.s	$⊢ S = (m \in \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} ⟼ m (\|m\| - 1))$
Assertion	efgsf	$⊢ S : \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} ⟶ W$

Proof

Step	Hyp	Ref	Expression
1		efgval.w	$⊢ W = I (Word (I \times 2_{𝑜}))$
2		efgval.r	$⊢ \underset{˙}{\sim} = ~_{FG} (I)$
3		efgval2.m	$⊢ M = (y \in I, z \in 2_{𝑜} ⟼ ⟨y, 1_{𝑜} ∖ z⟩)$
4		efgval2.t	$⊢ T = (v \in W ⟼ (n \in (0 \dots \|v\|), w \in (I \times 2_{𝑜}) ⟼ v splice ⟨n, n, ⟨“ w M (w) ”⟩⟩))$
5		efgred.d	$⊢ D = W ∖ ⋃_{x \in W} ran T (x)$
6		efgred.s	$⊢ S = (m \in \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} ⟼ m (\|m\| - 1))$
7		id	$⊢ m = t \to m = t$
8		fveq2	$⊢ m = t \to \|m\| = \|t\|$
9	8	oveq1d	$⊢ m = t \to \|m\| - 1 = \|t\| - 1$
10	7 9	fveq12d	$⊢ m = t \to m (\|m\| - 1) = t (\|t\| - 1)$
11	10	eleq1d	$⊢ m = t \to (m (\|m\| - 1) \in W \leftrightarrow t (\|t\| - 1) \in W)$
12	11	ralrab2	$⊢ \forall m \in \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} m (\|m\| - 1) \in W \leftrightarrow \forall t \in (Word W ∖ \{\emptyset\}) ((t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1))) \to t (\|t\| - 1) \in W)$
13		eldifi	$⊢ t \in (Word W ∖ \{\emptyset\}) \to t \in Word W$
14		wrdf	$⊢ t \in Word W \to t : (0 ..^\|t\|) ⟶ W$
15	13 14	syl	$⊢ t \in (Word W ∖ \{\emptyset\}) \to t : (0 ..^\|t\|) ⟶ W$
16		eldifsn	$⊢ t \in (Word W ∖ \{\emptyset\}) \leftrightarrow (t \in Word W \land t \neq \emptyset)$
17		lennncl	$⊢ (t \in Word W \land t \neq \emptyset) \to \|t\| \in ℕ$
18	16 17	sylbi	$⊢ t \in (Word W ∖ \{\emptyset\}) \to \|t\| \in ℕ$
19		fzo0end	$⊢ \|t\| \in ℕ \to \|t\| - 1 \in (0 ..^\|t\|)$
20	18 19	syl	$⊢ t \in (Word W ∖ \{\emptyset\}) \to \|t\| - 1 \in (0 ..^\|t\|)$
21	15 20	ffvelrnd	$⊢ t \in (Word W ∖ \{\emptyset\}) \to t (\|t\| - 1) \in W$
22	21	a1d	$⊢ t \in (Word W ∖ \{\emptyset\}) \to ((t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1))) \to t (\|t\| - 1) \in W)$
23	12 22	mprgbir	$⊢ \forall m \in \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} m (\|m\| - 1) \in W$
24	6	fmpt	$⊢ \forall m \in \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} m (\|m\| - 1) \in W \leftrightarrow S : \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} ⟶ W$
25	23 24	mpbi	$⊢ S : \{t \in (Word W ∖ \{\emptyset\}) \| (t (0) \in D \land \forall k \in (1 ..^\|t\|) t (k) \in ran T (t (k - 1)))\} ⟶ W$

Metamath Proof Explorer

Theorem efgsf

Proof