Proof of Nuprl Lemma : urec-level

Step * 1 1 1 1 1 of Lemma urec-level_wf

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

⊢ con:Constr(T.F[T]) × {L:(F^n - 1 Void) List| (con L) = z ∈ Base}  ~ con:Constr(T.F[T]) × {L:(F^n - 1 Void) List|

                                                                                           ap-con(con;L) = z ∈ Base}

BY
{ (RepUR ``ap-con`` 0 THEN Auto) }

Latex:

Latex:
.....equality..... 1. F : Type {}\mrightarrow{} Type 2. \mforall{}T:Type. ((T \msubseteq{}r Base) {}\mRightarrow{} (F[T] \msubseteq{}r Base)) 3. f : \mcap{}T:\{T:Type| T \msubseteq{}r Base\} . (x:F[T] {}\mrightarrow{} decomp\{i:l\}(T.F[T];T;x)) 4. n : \mBbbZ{} 5. 0 < n 6. \mforall{}x:F\^{}n - 1 Void. (urec-level(f;x) \mmember{} \mBbbN{}) 7. z : F (F\^{}n - 1 Void) 8. \mforall{}m:\mBbbN{}. ((F\^{}m Void) \msubseteq{}r Base) \mvdash{} con:Constr(T.F[T]) \mtimes{} \{L:(F\^{}n - 1 Void) List| (con L) = z\} \msim{} con:Constr(T.F[T]) \mtimes{} \{L:(F\^{}n - 1 Void) List| ap-con(con;L) = z\} By Latex: (RepUR ``ap-con`` 0 THEN Auto) Home Index