Step
*
1
1
1
2
of Lemma
cnv-taba_wf
1. A : Type
2. B : Type
3. u : A
4. v : A List
5. ∀ys:B List
((||v|| ≤ ||ys||)
⇒ (rec-case(v) of
[] => <[], ys>
x::xs' =>
p.let a,ys = p
in let h,t = ys
in <[<x, h> / a], t> ∈ {p:(A × B) List × (B List)| (||v|| + ||snd(p)||) = ||ys|| ∈ ℤ} ))
⊢ ∀ys:B List
(((||v|| + 1) ≤ ||ys||)
⇒ (let a,ys = rec-case(v) of
[] => <[], ys>
h@0::t =>
r.let a,ys = r
in let h,t = ys
in <[<h@0, h> / a], t>
in let h,t = ys
in <[<u, h> / a], t> ∈ {p:(A × B) List × (B List)| ((||v|| + 1) + ||snd(p)||) = ||ys|| ∈ ℤ} ))
BY
{ xxx((RepeatFor 2 (ParallelLast) THENA Auto') THEN GenConclAtAddr [2;1] THEN Thin (-1))xxx }
1
1. A : Type
2. B : Type
3. u : A
4. v : A List
5. ∀ys:B List
((||v|| ≤ ||ys||)
⇒ (rec-case(v) of
[] => <[], ys>
x::xs' =>
p.let a,ys = p
in let h,t = ys
in <[<x, h> / a], t> ∈ {p:(A × B) List × (B List)| (||v|| + ||snd(p)||) = ||ys|| ∈ ℤ} ))
6. ys : B List
7. (||v|| + 1) ≤ ||ys||
8. rec-case(v) of
[] => <[], ys>
x::xs' =>
p.let a,ys = p
in let h,t = ys
in <[<x, h> / a], t> ∈ {p:(A × B) List × (B List)| (||v|| + ||snd(p)||) = ||ys|| ∈ ℤ}
9. v1 : {p:(A × B) List × (B List)| (||v|| + ||snd(p)||) = ||ys|| ∈ ℤ}
⊢ let a,ys = v1
in let h,t = ys
in <[<u, h> / a], t> ∈ {p:(A × B) List × (B List)| ((||v|| + 1) + ||snd(p)||) = ||ys|| ∈ ℤ}
Latex:
Latex:
1. A : Type
2. B : Type
3. u : A
4. v : A List
5. \mforall{}ys:B List
((||v|| \mleq{} ||ys||)
{}\mRightarrow{} (rec-case(v) of
[] => <[], ys>
x::xs' =>
p.let a,ys = p
in let h,t = ys
in <[<x, h> / a], t> \mmember{} \{p:(A \mtimes{} B) List \mtimes{} (B List)| (||v|| + ||snd(p)||) = ||ys||\} ))
\mvdash{} \mforall{}ys:B List
(((||v|| + 1) \mleq{} ||ys||)
{}\mRightarrow{} (let a,ys = rec-case(v) of
[] => <[], ys>
h@0::t =>
r.let a,ys = r
in let h,t = ys
in <[<h@0, h> / a], t>
in let h,t = ys
in <[<u, h> / a], t> \mmember{} \{p:(A \mtimes{} B) List \mtimes{} (B List)| ((||v|| + 1) + ||snd(p)||) = ||ys||\} )\000C)
By
Latex:
xxx((RepeatFor 2 (ParallelLast) THENA Auto') THEN GenConclAtAddr [2;1] THEN Thin (-1))xxx
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