Proof of Nuprl Lemma : State-loc-comb-classrel-non-loc

Step * 2 2 1 2 of Lemma State-loc-comb-classrel-non-loc

1. Info : Type
2. B : Type
3. A : Type
4. f : Id ─→ A ─→ B ─→ B
5. init : Id ─→ bag(B)
6. X : EClass(A)@i'
7. es : EO+(Info)@i'
8. e : E@i
9. ∀e':E. ((e' < e) ⇒ (∀v:B. (v ∈ State-loc-comb(init;f;X)(e') ⇐⇒ v ∈ State-comb(init;f loc(e');X)(e'))))
10. v : B@i
11. ¬((X es e) = {} ∈ bag(A))
12. a : A
13. b : B
14. a ∈ X(e)
15. e' : E
16. es-p-local-pred(es;λe'.(↓∃w:B

                              w ∈ λx,s. if bag-null(x) then s else lifting-2(f loc(e)) x s fi |X,Prior(self)?init|(e')))\000C

e
e'
17. b ∈ λx,s. if bag-null(x) then s else lifting-2(f loc(e)) x s fi |X,Prior(self)?init|(e')
18. v = (f loc(e) a b) ∈ B
19. ¬((X es e) = {} ∈ bag(A))
20. es-p-local-pred(es;λe'.(↓∃w:B

                              w ∈ λl,x,s. if bag-null(x) then s else lifting-loc-2(f) l x s fi |Loc, X, Prior(self)?init\000C|(

                                  e')))
    e
    e'
⊢ b ∈ λl,x,s. if bag-null(x) then s else lifting-loc-2(f) l x s fi |Loc, X, Prior(self)?init|(e')
BY
{ (RepUR ``es-p-local-pred`` (-5)
   THEN RepD
   THEN (InstHyp [⌈e'⌉;⌈b⌉] (-14)⋅ THENA Auto)
   THEN RepUR ``State-loc-comb State-comb`` (-1)
   THEN BHyp (-1)
   THEN Subst ⌈loc(e') = loc(e) ∈ Id⌉ 0⋅
   THEN MaAuto) }

Latex:

Latex:
1. Info : Type 2. B : Type 3. A : Type 4. f : Id {}\mrightarrow{} A {}\mrightarrow{} B {}\mrightarrow{} B 5. init : Id {}\mrightarrow{} bag(B) 6. X : EClass(A)@i' 7. es : EO+(Info)@i' 8. e : E@i 9. \mforall{}e':E ((e' < e) {}\mRightarrow{} (\mforall{}v:B. (v \mmember{} State-loc-comb(init;f;X)(e') \mLeftarrow{}{}\mRightarrow{} v \mmember{} State-comb(init;f loc(e');X)(e')))) 10. v : B@i 11. \mneg{}((X es e) = \{\}) 12. a : A 13. b : B 14. a \mmember{} X(e) 15. e' : E 16. es-p-local-pred(es;\mlambda{}e'.(\mdownarrow{}\mexists{}w:B w \mmember{} \mlambda{}x,s. if bag-null(x) then s else lifting-2(f loc(e)) x s fi |X,Prior(self)?init|(e'))) e e' 17. b \mmember{} \mlambda{}x,s. if bag-null(x) then s else lifting-2(f loc(e)) x s fi |X,Prior(self)?init|(e') 18. v = (f loc(e) a b) 19. \mneg{}((X es e) = \{\}) 20. es-p-local-pred(es;\mlambda{}e'.(\mdownarrow{}\mexists{}w:B w \mmember{} \mlambda{}l,x,s. if bag-null(x) then s else lifting-loc-2(f) l x s fi |Loc, X, Prior(self)?init|(e'))) e e' \mvdash{} b \mmember{} \mlambda{}l,x,s. if bag-null(x) then s else lifting-loc-2(f) l x s fi |Loc, X, Prior(self)?init|(e') By Latex: (RepUR ``es-p-local-pred`` (-5) THEN RepD THEN (InstHyp [\mkleeneopen{}e'\mkleeneclose{};\mkleeneopen{}b\mkleeneclose{}] (-14)\mcdot{} THENA Auto) THEN RepUR ``State-loc-comb State-comb`` (-1) THEN BHyp (-1) THEN Subst \mkleeneopen{}loc(e') = loc(e)\mkleeneclose{} 0\mcdot{} THEN MaAuto) Home Index