Proof of Nuprl Lemma : urec-lfp

Step * of Lemma urec-lfp

No Annotations

∀[f:Type ⟶ Type]. ⋂r:{r:Type| (f r) ⊆r r} . r ≡ urec(f) supposing continuous'-monotone{i:l}(T.f T)

BY
{ (Intros
   THEN (D 0 THEN Auto)
   THEN (D 0 THENA Auto)
   THEN Unfold `urec` (-1)
   THEN D_union (-1)
   THEN (DoSubsume THEN Auto)
   THEN (RepeatFor 2 (Thin (-1)) THEN NatInd (-1))) }

1
.....basecase.....
1. f : Type ⟶ Type
2. continuous'-monotone{i:l}(T.f T)
3. n : ℤ
⊢ (f^0 Void) ⊆r (⋂r:{r:Type| (f r) ⊆r r} . r)

2
.....upcase.....
1. f : Type ⟶ Type
2. continuous'-monotone{i:l}(T.f T)
3. n : ℤ
4. 0 < n
5. (f^n - 1 Void) ⊆r (⋂r:{r:Type| (f r) ⊆r r} . r)
⊢ (f^n Void) ⊆r (⋂r:{r:Type| (f r) ⊆r r} . r)

Latex:

Latex:
No Annotations \mforall{}[f:Type {}\mrightarrow{} Type]. \mcap{}r:\{r:Type| (f r) \msubseteq{}r r\} . r \mequiv{} urec(f) supposing continuous'-monotone\{i:l\}(T.f T) By Latex: (Intros THEN (D 0 THEN Auto) THEN (D 0 THENA Auto) THEN Unfold `urec` (-1) THEN D\_union (-1) THEN (DoSubsume THEN Auto) THEN (RepeatFor 2 (Thin (-1)) THEN NatInd (-1))) Home Index