Proof of Nuprl Lemma : iterated-classrel-invariant2

Step * of Lemma iterated-classrel-invariant2

∀[Info,A,S:Type]. ∀[init:Id ⟶ bag(S)]. ∀[f:A ⟶ S ⟶ S].
  ∀X:EClass(A). ∀es:EO+(Info).
    ∀[P:E ⟶ S ⟶ ℙ]
      ∀e:E. ∀v:S.
        ((∀s:S. ∀e':E.
            (e' ≤loc e
            ⇒ if first(e')
               then s ↓∈ init loc(e')
               else iterated-classrel(es;S;A;f;init;X;pred(e');s) ∧ P[pred(e');s]
               fi
            ⇒ if e' ∈_b X then ∀a:A. (a ∈ X(e') ⇒ P[e';f a s]) else P[e';s] fi ))
        ⇒ iterated-classrel(es;S;A;f;init;X;e;v)
        ⇒ P[e;v])
BY
{ ((UnivCD THENA Auto)
   THEN RepeatFor 4 (MoveToConcl (-1))
   THEN StrongCausalInd
   THEN (UnivCD THENA Auto)
   THEN RecUnfold `iterated-classrel` (-1)
   THEN ExRepD
   THEN (SplitOnHypITE (-2) THENA Auto)) }

1
.....truecase.....
1. [Info] : Type
2. [A] : Type
3. [S] : Type
4. [init] : Id ⟶ bag(S)
5. [f] : A ⟶ S ⟶ S
6. X : EClass(A)@i'
7. es : EO+(Info)@i'
8. [P] : E ⟶ S ⟶ ℙ
9. e : E@i
10. ∀e1:E
      ((e1 < e)
      ⇒ (∀v:S
            ((∀s:S. ∀e':E.
                (e' ≤loc e1
                ⇒ if first(e')
                   then s ↓∈ init loc(e')
                   else iterated-classrel(es;S;A;f;init;X;pred(e');s) ∧ P[pred(e');s]
                   fi
                ⇒ if e' ∈_b X then ∀a:A. (a ∈ X(e') ⇒ P[e';f a s]) else P[e';s] fi ))
            ⇒ iterated-classrel(es;S;A;f;init;X;e1;v)
            ⇒ P[e1;v])))
11. v : S@i
12. ∀s:S. ∀e':E.
      (e' ≤loc e
      ⇒

 if first(e') then s ↓∈ init loc(e') else iterated-classrel(es;S;A;f;init;X;pred(e');s) ∧ P[pred(e');s] fi

⇒ if e' ∈_b X then ∀a:A. (a ∈ X(e') ⇒ P[e';f a s]) else P[e';s] fi )@i
13. z : S@i
14. z ↓∈ init loc(e)@i

15. (∃a:A. (a ∈ X(e) ∧ (v = (f a z) ∈ S))) ∨ ((∀a:A. (¬a ∈ X(e))) ∧ (v = z ∈ S))@i

16. ↑first(e)
⊢ P[e;v]

2
.....falsecase.....
1. [Info] : Type
2. [A] : Type
3. [S] : Type
4. [init] : Id ⟶ bag(S)
5. [f] : A ⟶ S ⟶ S
6. X : EClass(A)@i'
7. es : EO+(Info)@i'
8. [P] : E ⟶ S ⟶ ℙ
9. e : E@i
10. ∀e1:E
      ((e1 < e)
      ⇒ (∀v:S
            ((∀s:S. ∀e':E.
                (e' ≤loc e1
                ⇒ if first(e')
                   then s ↓∈ init loc(e')
                   else iterated-classrel(es;S;A;f;init;X;pred(e');s) ∧ P[pred(e');s]
                   fi
                ⇒ if e' ∈_b X then ∀a:A. (a ∈ X(e') ⇒ P[e';f a s]) else P[e';s] fi ))
            ⇒ iterated-classrel(es;S;A;f;init;X;e1;v)
            ⇒ P[e1;v])))
11. v : S@i
12. ∀s:S. ∀e':E.
      (e' ≤loc e
      ⇒

 if first(e') then s ↓∈ init loc(e') else iterated-classrel(es;S;A;f;init;X;pred(e');s) ∧ P[pred(e');s] fi

⇒ if e' ∈_b X then ∀a:A. (a ∈ X(e') ⇒ P[e';f a s]) else P[e';s] fi )@i
13. z : S@i
14. iterated-classrel(es;S;A;f;init;X;pred(e);z)@i

15. (∃a:A. (a ∈ X(e) ∧ (v = (f a z) ∈ S))) ∨ ((∀a:A. (¬a ∈ X(e))) ∧ (v = z ∈ S))@i

16. ¬↑first(e)
⊢ P[e;v]

Latex:

Latex:
\mforall{}[Info,A,S:Type]. \mforall{}[init:Id {}\mrightarrow{} bag(S)]. \mforall{}[f:A {}\mrightarrow{} S {}\mrightarrow{} S]. \mforall{}X:EClass(A). \mforall{}es:EO+(Info). \mforall{}[P:E {}\mrightarrow{} S {}\mrightarrow{} \mBbbP{}] \mforall{}e:E. \mforall{}v:S. ((\mforall{}s:S. \mforall{}e':E. (e' \mleq{}loc e {}\mRightarrow{} if first(e') then s \mdownarrow{}\mmember{} init loc(e') else iterated-classrel(es;S;A;f;init;X;pred(e');s) \mwedge{} P[pred(e');s] fi {}\mRightarrow{} if e' \mmember{}\msubb{} X then \mforall{}a:A. (a \mmember{} X(e') {}\mRightarrow{} P[e';f a s]) else P[e';s] fi )) {}\mRightarrow{} iterated-classrel(es;S;A;f;init;X;e;v) {}\mRightarrow{} P[e;v]) By Latex: ((UnivCD THENA Auto) THEN RepeatFor 4 (MoveToConcl (-1)) THEN StrongCausalInd THEN (UnivCD THENA Auto) THEN RecUnfold `iterated-classrel` (-1) THEN ExRepD THEN (SplitOnHypITE (-2) THENA Auto)) Home Index