Step
*
of Lemma
cp-ktype_wf
∀[cp:ClassProgram(Top)]. ∀[i:{i:Id| (i ∈ cp-domain(cp))} ]. ∀[k:{k:Knd| (k ∈ cp-kinds(cp) i)} ].
(cp-ktype(cp;i;k) ∈ Type)
BY
{ (Unfolds ``class-program cp-domain cp-kinds cp-ktype`` 0 THEN Auto) }
1
1. cp : i:Id fp-> A:Type
× ks:{k:Knd| ↑hasloc(k;i)} List
× typ:{k:Knd| (k ∈ ks)} ⟶ Type
× k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A ⟶ (Top + Top)
× A ⟶ k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A
× A
2. i : {i:Id| (i ∈ fpf-domain(cp))}
3. k : {k:Knd| (k ∈ (λi.let A,ks,typ,h,acc,init = cp(i) in ks) i)}
⊢ let A,ks,typ,h,acc,init = cp(i) in
typ k ∈ Type
2
1. cp : i:Id fp-> A:Type
× ks:{k:Knd| ↑hasloc(k;i)} List
× typ:{k:Knd| (k ∈ ks)} ⟶ Type
× k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A ⟶ (Top + Top)
× A ⟶ k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A
× A
2. i : {i:Id| (i ∈ fpf-domain(cp))}
3. k : Knd@i
⊢ let A,ks,typ,h,acc,init = cp(i) in
ks ∈ Knd List
3
1. cp : i:Id fp-> A:Type
× ks:{k:Knd| ↑hasloc(k;i)} List
× typ:{k:Knd| (k ∈ ks)} ⟶ Type
× k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A ⟶ (Top + Top)
× A ⟶ k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A
× A
2. i : {i:Id| (i ∈ fpf-domain(cp))}
3. ⋂k:{k:Knd| (k ∈ (λi.let A,ks,typ,h,acc,init = cp(i) in ks) i)} . (let A,ks,typ,h,acc,init = cp(i) in typ k ∈ Type)
4. k : Knd@i
⊢ let A,ks,typ,h,acc,init = cp(i) in
ks ∈ Knd List
4
1. cp : i:Id fp-> A:Type
× ks:{k:Knd| ↑hasloc(k;i)} List
× typ:{k:Knd| (k ∈ ks)} ⟶ Type
× k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A ⟶ (Top + Top)
× A ⟶ k:{k:Knd| (k ∈ ks)} ⟶ (typ k) ⟶ A
× A
2. i : {i:Id| (i ∈ fpf-domain(cp))}
3. ⋂k:{k:Knd| (k ∈ (λi.let A,ks,typ,h,acc,init = cp(i) in ks) i)} . (let A,ks,typ,h,acc,init = cp(i) in typ k ∈ Type)
4. k : Knd@i
⊢ let A,ks,typ,h,acc,init = cp(i) in
ks ∈ Knd List
Latex:
Latex:
\mforall{}[cp:ClassProgram(Top)]. \mforall{}[i:\{i:Id| (i \mmember{} cp-domain(cp))\} ]. \mforall{}[k:\{k:Knd| (k \mmember{} cp-kinds(cp) i)\} ].
(cp-ktype(cp;i;k) \mmember{} Type)
By
Latex:
(Unfolds ``class-program cp-domain cp-kinds cp-ktype`` 0 THEN Auto)
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