Proof of Nuprl Lemma : nth

Step * of Lemma nth_tl-append

∀[as:Top List]. ∀[bs:Top].

  ∀n:ℕ. (nth_tl(n;as @ bs) ~ if n <z ||as|| then nth_tl(n;as) @ bs else nth_tl(n - ||as||;bs) fi )

BY
{ (InductionOnList⋅ THEN Reduce 0) }

1
∀[bs:Top]. ∀n:ℕ. (nth_tl(n;bs) ~ if n <z 0 then nth_tl(n;[]) @ bs else nth_tl(n - 0;bs) fi )

2
1. u : Top
2. v : Top List

3. ∀[bs:Top]. ∀n:ℕ. (nth_tl(n;v @ bs) ~ if n <z ||v|| then nth_tl(n;v) @ bs else nth_tl(n - ||v||;bs) fi )

⊢ ∀[bs:Top]

    ∀n:ℕ. (nth_tl(n;[u / (v @ bs)]) ~ if n <z ||v|| + 1 then nth_tl(n;[u / v]) @ bs else nth_tl(n - ||v|| + 1;bs) fi )

Latex:

Latex:
\mforall{}[as:Top List]. \mforall{}[bs:Top]. \mforall{}n:\mBbbN{}. (nth\_tl(n;as @ bs) \msim{} if n <z ||as|| then nth\_tl(n;as) @ bs else nth\_tl(n - ||as||;bs) fi ) By Latex: (InductionOnList\mcdot{} THEN Reduce 0) Home Index