Step
*
1
1
of Lemma
cnv-taba_wf
1. A : Type
2. B : Type
⊢ ∀xs:A List. ∀ys:B List.
((||xs|| ≤ ||ys||)
⇒ (fst(rec-case(xs) of
[] => <[], ys>
x::xs' =>
p.let a,ys = p
in let h,t = ys
in <[<x, h> / a], t>) ∈ (A × B) List))
BY
{ Assert ⌜∀xs:A List. ∀ys:B List.
((||xs|| ≤ ||ys||)
⇒ (rec-case(xs) 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)| (||xs|| + ||snd(p)||) = ||ys|| ∈ ℤ} ))⌝⋅ }
1
.....assertion.....
1. A : Type
2. B : Type
⊢ ∀xs:A List. ∀ys:B List.
((||xs|| ≤ ||ys||)
⇒ (rec-case(xs) 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)| (||xs|| + ||snd(p)||) = ||ys|| ∈ ℤ} ))
2
1. A : Type
2. B : Type
3. ∀xs:A List. ∀ys:B List.
((||xs|| ≤ ||ys||)
⇒ (rec-case(xs) 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)| (||xs|| + ||snd(p)||) = ||ys|| ∈ ℤ} ))
⊢ ∀xs:A List. ∀ys:B List.
((||xs|| ≤ ||ys||)
⇒ (fst(rec-case(xs) of
[] => <[], ys>
x::xs' =>
p.let a,ys = p
in let h,t = ys
in <[<x, h> / a], t>) ∈ (A × B) List))
Latex:
Latex:
1. A : Type
2. B : Type
\mvdash{} \mforall{}xs:A List. \mforall{}ys:B List.
((||xs|| \mleq{} ||ys||)
{}\mRightarrow{} (fst(rec-case(xs) of
[] => <[], ys>
x::xs' =>
p.let a,ys = p
in let h,t = ys
in <[<x, h> / a], t>) \mmember{} (A \mtimes{} B) List))
By
Latex:
Assert \mkleeneopen{}\mforall{}xs:A List. \mforall{}ys:B List.
((||xs|| \mleq{} ||ys||)
{}\mRightarrow{} (rec-case(xs) 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)|
(||xs|| + ||snd(p)||) = ||ys||\} ))\mkleeneclose{}\mcdot{}
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