Proof of Nuprl Lemma : mrecind

Step * 1 1 of Lemma mrecind_wf

1. L : MutualRectypeSpec
2. P : mobj(L) ⟶ ℙ
3. k : Atom
4. (k ∈ eager-map(λp.(fst(p));L))
5. lbl : {lbl:Atom| 0 < ||mrec-spec(L;lbl;k)||}
6. v : (Atom + Atom + Type) List
7. mrec-spec(L;lbl;k) = v ∈ ((Atom + Atom + Type) List)
8. 0 < ||v||
9. t : tuple-type(map(λx.case x
                          of inl(y) =>
                          case y
                           of inl(p) =>
                           prec(lbl,p.mrec-spec(L;lbl;p);p)
                           | inr(p) =>
                           prec(lbl,p.mrec-spec(L;lbl;p);p) List
                          | inr(E) =>
                          E;v))
10. j : ℕ||v||
11. x : Atom + Atom
12. v[j] = (inl x) ∈ (Atom + Atom + Type)
13. x1 : Atom
14. x = (inl x1) ∈ (Atom + Atom)
⊢ P[<x1, t.j>] ∈ ℙ
BY
{ ((GenConclTerm ⌜t.j⌝⋅ THENA (MemCD THEN Try (RWO "map-length" 0) THEN Auto))
   THEN Thin (-1)
   THEN (RWO "select-map" (-1) THENA Auto)
   THEN Reduce -1
   THEN Fold `mrec` (-1)
   THEN (GenConcl ⌜v1 = X ∈ mrec(L;x1)⌝⋅ THENM Auto)
   THEN InferEqualType
   THEN Auto
   THEN ((RWO "-4" 0 THEN Auto) THEN Reduce 0)
   THEN RWO "-2" 0
   THEN Auto) }

Latex:

Latex:
1. L : MutualRectypeSpec 2. P : mobj(L) {}\mrightarrow{} \mBbbP{} 3. k : Atom 4. (k \mmember{} eager-map(\mlambda{}p.(fst(p));L)) 5. lbl : \{lbl:Atom| 0 < ||mrec-spec(L;lbl;k)||\} 6. v : (Atom + Atom + Type) List 7. mrec-spec(L;lbl;k) = v 8. 0 < ||v|| 9. t : tuple-type(map(\mlambda{}x.case x of inl(y) => case y of inl(p) => prec(lbl,p.mrec-spec(L;lbl;p);p) | inr(p) => prec(lbl,p.mrec-spec(L;lbl;p);p) List | inr(E) => E;v)) 10. j : \mBbbN{}||v|| 11. x : Atom + Atom 12. v[j] = (inl x) 13. x1 : Atom 14. x = (inl x1) \mvdash{} P[<x1, t.j>] \mmember{} \mBbbP{} By Latex: ((GenConclTerm \mkleeneopen{}t.j\mkleeneclose{}\mcdot{} THENA (MemCD THEN Try (RWO "map-length" 0) THEN Auto)) THEN Thin (-1) THEN (RWO "select-map" (-1) THENA Auto) THEN Reduce -1 THEN Fold `mrec` (-1) THEN (GenConcl \mkleeneopen{}v1 = X\mkleeneclose{}\mcdot{} THENM Auto) THEN InferEqualType THEN Auto THEN ((RWO "-4" 0 THEN Auto) THEN Reduce 0) THEN RWO "-2" 0 THEN Auto) Home Index