Proof of Nuprl Lemma : cyclic-map-equipollent

Step * 2 1 1 2 2 of Lemma cyclic-map-equipollent

1. n : ℕ⁺
2. ∀L:Combination(n - 1;ℕn - 1). ([n - 1 / L] ∈ Combination(n;ℕn))
3. a1 : ℕn - 1 List
4. no_repeats(ℕn - 1;a1)
5. ||a1|| = (n - 1) ∈ ℤ
6. a2 : ℕn - 1 List
7. no_repeats(ℕn - 1;a2)
8. ||a2|| = (n - 1) ∈ ℤ
9. cycle([n - 1 / a1]) = cycle([n - 1 / a2]) ∈ cyclic-map(ℕn)
10. i : ℕ
11. i < ||a1||
12. (cycle([n - 1 / a1])^(i + 1) - 0 (n - 1)) = [n - 1 / a1][i + 1] ∈ ℕn
13. (cycle([n - 1 / a2])^(i + 1) - 0 (n - 1)) = [n - 1 / a2][i + 1] ∈ ℕn
⊢ a1[i] = a2[i] ∈ ℕn - 1
BY
{ ((RWO "select_cons_tl" (-2) THENA Auto) THEN (RWO "select_cons_tl" (-1) THENA Auto)) }

1
1. n : ℕ⁺
2. ∀L:Combination(n - 1;ℕn - 1). ([n - 1 / L] ∈ Combination(n;ℕn))
3. a1 : ℕn - 1 List
4. no_repeats(ℕn - 1;a1)
5. ||a1|| = (n - 1) ∈ ℤ
6. a2 : ℕn - 1 List
7. no_repeats(ℕn - 1;a2)
8. ||a2|| = (n - 1) ∈ ℤ
9. cycle([n - 1 / a1]) = cycle([n - 1 / a2]) ∈ cyclic-map(ℕn)
10. i : ℕ
11. i < ||a1||
12. (cycle([n - 1 / a1])^(i + 1) - 0 (n - 1)) = a1[(i + 1) - 1] ∈ ℕn
13. (cycle([n - 1 / a2])^(i + 1) - 0 (n - 1)) = a2[(i + 1) - 1] ∈ ℕn
⊢ a1[i] = a2[i] ∈ ℕn - 1

Latex:

Latex:
1. n : \mBbbN{}\msupplus{} 2. \mforall{}L:Combination(n - 1;\mBbbN{}n - 1). ([n - 1 / L] \mmember{} Combination(n;\mBbbN{}n)) 3. a1 : \mBbbN{}n - 1 List 4. no\_repeats(\mBbbN{}n - 1;a1) 5. ||a1|| = (n - 1) 6. a2 : \mBbbN{}n - 1 List 7. no\_repeats(\mBbbN{}n - 1;a2) 8. ||a2|| = (n - 1) 9. cycle([n - 1 / a1]) = cycle([n - 1 / a2]) 10. i : \mBbbN{} 11. i < ||a1|| 12. (cycle([n - 1 / a1])\^{}(i + 1) - 0 (n - 1)) = [n - 1 / a1][i + 1] 13. (cycle([n - 1 / a2])\^{}(i + 1) - 0 (n - 1)) = [n - 1 / a2][i + 1] \mvdash{} a1[i] = a2[i] By Latex: ((RWO "select\_cons\_tl" (-2) THENA Auto) THEN (RWO "select\_cons\_tl" (-1) THENA Auto)) Home Index