Proof of Nuprl Lemma : prec-induction-ext

Step * of Lemma prec-induction-ext

∀[P:Type]. ∀[a:Atom ⟶ P ⟶ ((P + P + Type) List)]. ∀[Q:i:P ⟶ prec(lbl,p.a[lbl;p];i) ⟶ TYPE].

  ((∀i:P. ∀x:prec(lbl,p.a[lbl;p];i).  ((∀j:P. ∀z:{z:prec(lbl,p.a[lbl;p];j)| prec_sub+(P;lbl,p.a[lbl;p]) <j, z> <i, x>} .\000C  Q[j;z])

⇒ Q[i;x]))
  ⇒ (∀i:P. ∀x:prec(lbl,p.a[lbl;p];i).  Q[i;x]))
BY
{ Extract of Obid: prec-induction
  normalizes to:

  λh,i,x. (letrec r(i)=λx.(h i x (λj,z. (r j z))) in r(i) x)
  finishing with Auto }

Latex:

Latex:
\mforall{}[P:Type]. \mforall{}[a:Atom {}\mrightarrow{} P {}\mrightarrow{} ((P + P + Type) List)]. \mforall{}[Q:i:P {}\mrightarrow{} prec(lbl,p.a[lbl;p];i) {}\mrightarrow{} TYPE]. ((\mforall{}i:P. \mforall{}x:prec(lbl,p.a[lbl;p];i). ((\mforall{}j:P. \mforall{}z:\{z:prec(lbl,p.a[lbl;p];j)| prec\_sub+(P;lbl,p.a[lbl;p]) <j, z> <i, x>\} . Q[j;z]) {}\mRightarrow{}\000C Q[i;x])) {}\mRightarrow{} (\mforall{}i:P. \mforall{}x:prec(lbl,p.a[lbl;p];i). Q[i;x])) By Latex: Extract of Obid: prec-induction normalizes to: \mlambda{}h,i,x. (letrec r(i)=\mlambda{}x.(h i x (\mlambda{}j,z. (r j z))) in r(i) x) finishing with Auto Home Index