Proof of Nuprl Lemma : select

Step * of Lemma select_zip

∀[T1,T2:Type]. ∀[as:T1 List]. ∀[bs:T2 List]. ∀[i:ℕ].
zip(as;bs)[i] = <as[i], bs[i]> ∈ (T1 × T2) supposing i < ||zip(as;bs)||
BY
{ (InductionOnList THEN Try (InductionOnList⋅) THEN RecUnfold `zip` 0 THEN Reduce 0 THEN Auto) }

1
1. T1 : Type
2. T2 : Type
3. u : T1
4. v : T1 List
5. ∀[bs:T2 List]. ∀[i:ℕ]. zip(v;bs)[i] = <v[i], bs[i]> ∈ (T1 × T2) supposing i < ||zip(v;bs)||
6. u1 : T2
7. v1 : T2 List

8. ∀[i:ℕ]. zip([u / v];v1)[i] = <[u / v][i], v1[i]> ∈ (T1 × T2) supposing i < ||zip([u / v];v1)||

9. i : ℕ
10. i < ||zip(v;v1)|| + 1
⊢ [<u, u1> / zip(v;v1)][i] = <[u / v][i], [u1 / v1][i]> ∈ (T1 × T2)

Latex:

Latex:
\mforall{}[T1,T2:Type]. \mforall{}[as:T1 List]. \mforall{}[bs:T2 List]. \mforall{}[i:\mBbbN{}]. zip(as;bs)[i] = <as[i], bs[i]> supposing i < ||zip(as;bs)|| By Latex: (InductionOnList THEN Try (InductionOnList\mcdot{}) THEN RecUnfold `zip` 0 THEN Reduce 0 THEN Auto) Home Index