Proof of Nuprl Lemma : fixpoint-induction-bottom-base

Step * of Lemma fixpoint-induction-bottom-base

∀E,S:Type. ∀G,g:Base.
  ((G ∈ S ⟶ partial(E)) ⇒ (g ∈ S ⟶ S) ⇒ value-type(E) ⇒ mono(E) ⇒ (⊥ ∈ S) ⇒ (G fix(g) ∈ partial(E)))
BY
{ TACTIC:(UnivCD
          THENA (Try (Complete (((Unfold `member` 0 THEN BLemma `equal-wf-base`) THEN Auto)))
                 THEN Try (BLemma `bottom-member-prop`)
                 THEN Auto)
          ) }

1
1. E : Type
2. S : Type
3. G : Base
4. g : Base
5. G ∈ S ⟶ partial(E)
6. g ∈ S ⟶ S
7. value-type(E)
8. mono(E)
9. ⊥ ∈ S
⊢ G fix(g) ∈ partial(E)

Latex:

Latex:
\mforall{}E,S:Type. \mforall{}G,g:Base. ((G \mmember{} S {}\mrightarrow{} partial(E)) {}\mRightarrow{} (g \mmember{} S {}\mrightarrow{} S) {}\mRightarrow{} value-type(E) {}\mRightarrow{} mono(E) {}\mRightarrow{} (\mbot{} \mmember{} S) {}\mRightarrow{} (G fix(g) \mmember{} partial(E))) By Latex: TACTIC:(UnivCD THENA (Try (Complete (((Unfold `member` 0 THEN BLemma `equal-wf-base`) THEN Auto))) THEN Try (BLemma `bottom-member-prop`) THEN Auto) ) Home Index