Proof of Nuprl Lemma : vdf-eq

Step * of Lemma vdf-eq_wf

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∀[A,B:Type]. ∀[C:A ⟶ B ⟶ Type].  ∀L:(a:A × b:B × C[a;b]) List. ∀[f:very-dep-fun(A;B;a,b.C[a;b])]. (vdf-eq(A;f;L) ∈ ℙ)

BY
{ (InstLemma `vdf-wf` [] THEN RepeatFor 3 (ParallelLast') THEN Intros THEN Unhide) }

1
1. A : Type
2. B : Type
3. C : A ⟶ B ⟶ Type
4. ∀n:ℕ
((vdf(A;B;a,b.C[a;b];n) ∈ Type)
∧ (∀f:vdf(A;B;a,b.C[a;b];n). ∀L:(a:A × b:B × C[a;b]) List. ((||L|| ≤ (n + 1)) ⇒ (vdf-eq(A;f;L) ∈ ℙ))))
5. L : (a:A × b:B × C[a;b]) List
6. f : very-dep-fun(A;B;a,b.C[a;b])
⊢ vdf-eq(A;f;L) ∈ ℙ

Latex:

Latex:
No Annotations \mforall{}[A,B:Type]. \mforall{}[C:A {}\mrightarrow{} B {}\mrightarrow{} Type]. \mforall{}L:(a:A \mtimes{} b:B \mtimes{} C[a;b]) List. \mforall{}[f:very-dep-fun(A;B;a,b.C[a;b])]. (vdf-eq(A;f;L) \mmember{} \mBbbP{}) By Latex: (InstLemma `vdf-wf` [] THEN RepeatFor 3 (ParallelLast') THEN Intros THEN Unhide) Home Index