Proof of Nuprl Lemma : corec-ext

Step * of Lemma corec-ext

∀[F:Type ⟶ Type]. corec(T.F[T]) ≡ F[corec(T.F[T])] supposing ContinuousMonotone(T.F[T])
BY
{ (Auto
   THEN (Assert ∀n:ℕ. (primrec(n + 1;Top;λj,T. F[T]) ⊆r primrec(n;Top;λj,T. F[T])) BY
               (InductionOnNat
                THEN Reduce 0
                THEN Try (Complete (Auto))
                THEN (RW (AddrC [1] (LemmaC `primrec-unroll`)) 0⋅ THENA Auto)
                THEN AutoSplit
                THEN (Subst' (n + 1) - 1 ~ n 0
                      THEN Try (Complete (Auto))
                      THEN (D 2 THEN Unfold `type-monotone` 2)

                      THEN InstHyp [⌜primrec(n;Top;λj,T. F[T])⌝;⌜primrec(n - 1;Top;λj,T. F[T])⌝] 2⋅

                      THEN Try (Complete (Auto))
                      THEN NthHypEq (-1)
                      THEN EqCD
                      THEN Auto
                      THEN (RW (AddrC [2] (LemmaC `primrec-unroll`)) 0⋅ THENA Auto)
                      THEN AutoSplit)⋅))
   ) }

1
1. F : Type ⟶ Type
2. ContinuousMonotone(T.F[T])
3. ∀n:ℕ. (primrec(n + 1;Top;λj,T. F[T]) ⊆r primrec(n;Top;λj,T. F[T]))
⊢ corec(T.F[T]) ≡ F[corec(T.F[T])]

Latex:

Latex:
\mforall{}[F:Type {}\mrightarrow{} Type]. corec(T.F[T]) \mequiv{} F[corec(T.F[T])] supposing ContinuousMonotone(T.F[T]) By Latex: (Auto THEN (Assert \mforall{}n:\mBbbN{}. (primrec(n + 1;Top;\mlambda{}j,T. F[T]) \msubseteq{}r primrec(n;Top;\mlambda{}j,T. F[T])) BY (InductionOnNat THEN Reduce 0 THEN Try (Complete (Auto)) THEN (RW (AddrC [1] (LemmaC `primrec-unroll`)) 0\mcdot{} THENA Auto) THEN AutoSplit THEN (Subst' (n + 1) - 1 \msim{} n 0 THEN Try (Complete (Auto)) THEN (D 2 THEN Unfold `type-monotone` 2) THEN InstHyp [\mkleeneopen{}primrec(n;Top;\mlambda{}j,T. F[T])\mkleeneclose{};\mkleeneopen{}primrec(n - 1;Top;\mlambda{}j,T. F[T])\mkleeneclose{}] 2\mcdot{} THEN Try (Complete (Auto)) THEN NthHypEq (-1) THEN EqCD THEN Auto THEN (RW (AddrC [2] (LemmaC `primrec-unroll`)) 0\mcdot{} THENA Auto) THEN AutoSplit)\mcdot{})) ) Home Index