Proof of Nuprl Lemma : adjacent-to-last

Step * 2 2 1 1 1 1 1 of Lemma adjacent-to-last

1. T : Type
2. u : T
3. u1 : T
4. v : T List
5. 0 < ||[u1 / v]|| + 1
6. ∀[i,j:ℕ].
     (¬([u; [u1 / v]][i] = [u; [u1 / v]][j] ∈ T)) supposing
        ((¬(i = j ∈ ℕ)) and
        j < ||[u; [u1 / v]]|| and
        i < ||[u; [u1 / v]]||)
7. a : T
8. 0 < ||[u1 / v]||
9. last([u1 / v]) = u ∈ T
10. a = hd([u1 / v]) ∈ T
11. ∀a:T. (adjacent(T;[u1 / v];last([u1 / v]);a) ⇐⇒ False) supposing no_repeats(T;[u1 / v])
12. ¬([u; [u1 / v]][0] = [u; [u1 / v]][||[u; [u1 / v]]|| - 1] ∈ T)
⊢ False
BY
{ (D (-1) THEN Reduce 0) }

1
1. T : Type
2. u : T
3. u1 : T
4. v : T List
5. 0 < ||[u1 / v]|| + 1
6. ∀[i,j:ℕ].
     (¬([u; [u1 / v]][i] = [u; [u1 / v]][j] ∈ T)) supposing
        ((¬(i = j ∈ ℕ)) and
        j < ||[u; [u1 / v]]|| and
        i < ||[u; [u1 / v]]||)
7. a : T
8. 0 < ||[u1 / v]||
9. last([u1 / v]) = u ∈ T
10. a = hd([u1 / v]) ∈ T
11. ∀a:T. (adjacent(T;[u1 / v];last([u1 / v]);a) ⇐⇒ False) supposing no_repeats(T;[u1 / v])
⊢ u = [u; [u1 / v]][((||v|| + 1) + 1) - 1] ∈ T

Latex:

Latex:
1. T : Type 2. u : T 3. u1 : T 4. v : T List 5. 0 < ||[u1 / v]|| + 1 6. \mforall{}[i,j:\mBbbN{}]. (\mneg{}([u; [u1 / v]][i] = [u; [u1 / v]][j])) supposing ((\mneg{}(i = j)) and j < ||[u; [u1 / v]]|| and i < ||[u; [u1 / v]]||) 7. a : T 8. 0 < ||[u1 / v]|| 9. last([u1 / v]) = u 10. a = hd([u1 / v]) 11. \mforall{}a:T. (adjacent(T;[u1 / v];last([u1 / v]);a) \mLeftarrow{}{}\mRightarrow{} False) supposing no\_repeats(T;[u1 / v]) 12. \mneg{}([u; [u1 / v]][0] = [u; [u1 / v]][||[u; [u1 / v]]|| - 1]) \mvdash{} False By Latex: (D (-1) THEN Reduce 0) Home Index