Proof of Nuprl Lemma : recode-tuple

Step * 1 2 1 2 1 of Lemma recode-tuple_wf

1. f : T:Type ⟶ (L:Type List × h:T ⟶ tuple-type(L) × {j:tuple-type(L) ⟶ T| ∀s:T. ((j (h s)) = s ∈ T)} )

2. u : Type
3. v : Type List
4. h : tuple-type(v) ⟶ Unit
5. v3 : Unit ⟶ tuple-type(v)
6. ∀s:tuple-type(v). ((v3 (h s)) = s ∈ tuple-type(v))
7. L : Type List
8. h1 : u ⟶ tuple-type(L)
9. v6 : tuple-type(L) ⟶ u
10. ∀s:u. ((v6 (h1 s)) = s ∈ u)
11. null(v) = ff
12. ¬0 < 0
13. s : u × tuple-type(v)
⊢ ((λx.<v6 x, v3 ⋅>) let a,b = s in append-tuple(||L||;0;h1 a;h b)) = s ∈ (u × tuple-type(v))
BY
{ (D (-1) THEN Reduce 0) }

1

1. f : T:Type ⟶ (L:Type List × h:T ⟶ tuple-type(L) × {j:tuple-type(L) ⟶ T| ∀s:T. ((j (h s)) = s ∈ T)} )

2. u : Type
3. v : Type List
4. h : tuple-type(v) ⟶ Unit
5. v3 : Unit ⟶ tuple-type(v)
6. ∀s:tuple-type(v). ((v3 (h s)) = s ∈ tuple-type(v))
7. L : Type List
8. h1 : u ⟶ tuple-type(L)
9. v6 : tuple-type(L) ⟶ u
10. ∀s:u. ((v6 (h1 s)) = s ∈ u)
11. null(v) = ff
12. ¬0 < 0
13. s1 : u
14. s2 : tuple-type(v)
⊢ <v6 append-tuple(||L||;0;h1 s1;h s2), v3 ⋅> = <s1, s2> ∈ (u × tuple-type(v))

Latex:

Latex:
1. f : T:Type {}\mrightarrow{} (L:Type List \mtimes{} h:T {}\mrightarrow{} tuple-type(L) \mtimes{} \{j:tuple-type(L) {}\mrightarrow{} T| \mforall{}s:T. ((j (h s)) = s)\} ) 2. u : Type 3. v : Type List 4. h : tuple-type(v) {}\mrightarrow{} Unit 5. v3 : Unit {}\mrightarrow{} tuple-type(v) 6. \mforall{}s:tuple-type(v). ((v3 (h s)) = s) 7. L : Type List 8. h1 : u {}\mrightarrow{} tuple-type(L) 9. v6 : tuple-type(L) {}\mrightarrow{} u 10. \mforall{}s:u. ((v6 (h1 s)) = s) 11. null(v) = ff 12. \mneg{}0 < 0 13. s : u \mtimes{} tuple-type(v) \mvdash{} ((\mlambda{}x.<v6 x, v3 \mcdot{}>) let a,b = s in append-tuple(||L||;0;h1 a;h b)) = s By Latex: (D (-1) THEN Reduce 0) Home Index