Proof of Nuprl Lemma : select-front-as-reduce

Step * 3 1 of Lemma select-front-as-reduce

1. n : ℕ
2. L : Top List
3. reduce(λu,x. if ||x|| <z n + 1 then x @ [u] else tl(x) @ [u] fi ;[];L) ~ rev(firstn(n + 1;L))
4. n < ||L||
⊢ L[n] ~ hd(rev(firstn(n + 1;L)))
BY
{ xxx(Decide n + 1 < ||L|| THENA Auto)xxx }

1
1. n : ℕ
2. L : Top List
3. reduce(λu,x. if ||x|| <z n + 1 then x @ [u] else tl(x) @ [u] fi ;[];L) ~ rev(firstn(n + 1;L))
4. n < ||L||
5. n + 1 < ||L||
⊢ L[n] ~ hd(rev(firstn(n + 1;L)))

2
1. n : ℕ
2. L : Top List
3. reduce(λu,x. if ||x|| <z n + 1 then x @ [u] else tl(x) @ [u] fi ;[];L) ~ rev(firstn(n + 1;L))
4. n < ||L||
5. ¬n + 1 < ||L||
⊢ L[n] ~ hd(rev(firstn(n + 1;L)))

Latex:

Latex:
1. n : \mBbbN{} 2. L : Top List 3. reduce(\mlambda{}u,x. if ||x|| <z n + 1 then x @ [u] else tl(x) @ [u] fi ;[];L) \msim{} rev(firstn(n + 1;L)) 4. n < ||L|| \mvdash{} L[n] \msim{} hd(rev(firstn(n + 1;L))) By Latex: xxx(Decide n + 1 < ||L|| THENA Auto)xxx Home Index