Proof of Nuprl Lemma : prec-induction

Step * 1 of Lemma prec-induction

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

4. ∀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])
5. i : P
6. x : prec(lbl,p.a[lbl;p];i)
7. ∀j:P. ∀z:{z:prec(lbl,p.a[lbl;p];j)| ||j;z|| < ||i;x||} . Q[j;z]
8. j : P
9. ∀z:{z:prec(lbl,p.a[lbl;p];j)| ||j;z|| < ||i;x||} . Q[j;z]
10. z : {z:prec(lbl,p.a[lbl;p];j)| prec_sub+(P;lbl,p.a[lbl;p]) <j, z> <i, x>}
⊢ z ∈ {z:prec(lbl,p.a[lbl;p];j)| ||j;z|| < ||i;x||}
BY
{ ((D -1 THEN MemTypeCD) THEN Auto THEN FLemma `prec-sub+-size` [-1] THEN Auto) }

Latex:

Latex:
.....wf..... 1. P : Type 2. a : Atom {}\mrightarrow{} P {}\mrightarrow{} ((P + P + Type) List) 3. Q : i:P {}\mrightarrow{} prec(lbl,p.a[lbl;p];i) {}\mrightarrow{} TYPE 4. \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{} \000CQ[i;x]) 5. i : P 6. x : prec(lbl,p.a[lbl;p];i) 7. \mforall{}j:P. \mforall{}z:\{z:prec(lbl,p.a[lbl;p];j)| ||j;z|| < ||i;x||\} . Q[j;z] 8. j : P 9. \mforall{}z:\{z:prec(lbl,p.a[lbl;p];j)| ||j;z|| < ||i;x||\} . Q[j;z] 10. z : \{z:prec(lbl,p.a[lbl;p];j)| prec\_sub+(P;lbl,p.a[lbl;p]) <j, z> <i, x>\} \mvdash{} z \mmember{} \{z:prec(lbl,p.a[lbl;p];j)| ||j;z|| < ||i;x||\} By Latex: ((D -1 THEN MemTypeCD) THEN Auto THEN FLemma `prec-sub+-size` [-1] THEN Auto) Home Index