Proof of Nuprl Lemma : urec-level-property

Step * 1 1 of Lemma urec-level-property

1. F : Type ⟶ Type
2. Monotone(T.F[T])
3. ∀T:Type. ((T ⊆r Base) ⇒ (F[T] ⊆r Base))
4. f : destructor{i:l}(T.F[T])
5. n : ℤ
6. 0 < n
7. ∀x:urec(F). (urec-level(f;x) < n - 1 ⇒ (x ∈ F^urec-level(f;x) Void))
8. x : urec(F)
9. urec-level(f;x) < n
⊢ x ∈ F^urec-level(f;x) Void
BY
{ (Unfold `urec` -2
   THEN D_union (-2)
   THEN RenameVar `m' (-3)
   THEN All Reduce
   THEN RenameVar `x' (-2)
   THEN Unfold `destructor` 4
   THEN CaseNat 0 `m'
   THEN Try ((HypSubst' (-1) (-3) THEN Reduce (-3) THEN Auto)⋅)
   THEN MoveToConcl (-2)) }

1
1. F : Type ⟶ Type
2. Monotone(T.F[T])
3. ∀T:Type. ((T ⊆r Base) ⇒ (F[T] ⊆r Base))
4. f : ⋂T:{T:Type| T ⊆r Base} . (x:F[T] ⟶ decomp{i:l}(T.F[T];T;x))
5. n : ℤ
6. 0 < n
7. ∀x:urec(F). (urec-level(f;x) < n - 1 ⇒ (x ∈ F^urec-level(f;x) Void))
8. m : ℕ
9. x : F^m Void
10. ¬(m = 0 ∈ ℤ)
⊢ urec-level(f;x) < n ⇒ (x ∈ F^urec-level(f;x) Void)

Latex:

Latex:
1. F : Type {}\mrightarrow{} Type 2. Monotone(T.F[T]) 3. \mforall{}T:Type. ((T \msubseteq{}r Base) {}\mRightarrow{} (F[T] \msubseteq{}r Base)) 4. f : destructor\{i:l\}(T.F[T]) 5. n : \mBbbZ{} 6. 0 < n 7. \mforall{}x:urec(F). (urec-level(f;x) < n - 1 {}\mRightarrow{} (x \mmember{} F\^{}urec-level(f;x) Void)) 8. x : urec(F) 9. urec-level(f;x) < n \mvdash{} x \mmember{} F\^{}urec-level(f;x) Void By Latex: (Unfold `urec` -2 THEN D\_union (-2) THEN RenameVar `m' (-3) THEN All Reduce THEN RenameVar `x' (-2) THEN Unfold `destructor` 4 THEN CaseNat 0 `m' THEN Try ((HypSubst' (-1) (-3) THEN Reduce (-3) THEN Auto)\mcdot{}) THEN MoveToConcl (-2)) Home Index