Proof of Nuprl Lemma : once-class-program

Step * 1 2 1 2 of Lemma once-class-program_wf

1. Info : Type
2. B : Type
3. X : EClass(B)
4. F : Id ─→ hdataflow(Info;B)
5. ∀es:EO+(Info). ∀e:E. (X(e) = (snd(F loc(e)*(map(λx.info(x);before(e)))(info(e)))) ∈ bag(B))
6. es : EO+(Info)@i'
7. e : E@i
8. hdf-once(F loc(e))*(map(λx.info(x);before(e)))
= hdf-once(if isl(class-pred(X;es;e)) then hdf-halt() else F loc(e)*(map(λx.info(x);before(e))) fi )
∈ hdataflow(Info;B)
9. y : Top@i
10. class-pred(X;es;e) = (inr y ) ∈ (E + Top)@i
⊢ (X es e) = (snd(hdf-once(F loc(e)*(map(λx.info(x);before(e))))(info(e)))) ∈ bag(B)
BY
{ (Fold `class-ap` 0 THEN (RWO "5" 0 THENA Auto)) }

1
1. Info : Type
2. B : Type
3. X : EClass(B)
4. F : Id ─→ hdataflow(Info;B)
5. ∀es:EO+(Info). ∀e:E. (X(e) = (snd(F loc(e)*(map(λx.info(x);before(e)))(info(e)))) ∈ bag(B))
6. es : EO+(Info)@i'
7. e : E@i
8. hdf-once(F loc(e))*(map(λx.info(x);before(e)))
= hdf-once(if isl(class-pred(X;es;e)) then hdf-halt() else F loc(e)*(map(λx.info(x);before(e))) fi )
∈ hdataflow(Info;B)
9. y : Top@i
10. class-pred(X;es;e) = (inr y ) ∈ (E + Top)@i
⊢ (snd(F loc(e)*(map(λx.info(x);before(e)))(info(e))))
= (snd(hdf-once(F loc(e)*(map(λx.info(x);before(e))))(info(e))))
∈ bag(B)

Latex:

Latex:
1. Info : Type 2. B : Type 3. X : EClass(B) 4. F : Id {}\mrightarrow{} hdataflow(Info;B) 5. \mforall{}es:EO+(Info). \mforall{}e:E. (X(e) = (snd(F loc(e)*(map(\mlambda{}x.info(x);before(e)))(info(e))))) 6. es : EO+(Info)@i' 7. e : E@i 8. hdf-once(F loc(e))*(map(\mlambda{}x.info(x);before(e))) = hdf-once(if isl(class-pred(X;es;e)) then hdf-halt() else F loc(e)*(map(\mlambda{}x.info(x);before(e))) fi ) 9. y : Top@i 10. class-pred(X;es;e) = (inr y )@i \mvdash{} (X es e) = (snd(hdf-once(F loc(e)*(map(\mlambda{}x.info(x);before(e))))(info(e)))) By Latex: (Fold `class-ap` 0 THEN (RWO "5" 0 THENA Auto)) Home Index