Proof of Nuprl Lemma : s-insert-no-repeats

Step * 2 3 of Lemma s-insert-no-repeats

1. T : Type
2. T ⊆r ℤ
3. x : T
4. u : T
5. v : T List
6. (no_repeats(T;s-insert(x;v))) supposing (no_repeats(T;v) and sorted(v))
7. sorted([u / v])
8. no_repeats(T;[u / v])
9. ¬(x = u ∈ ℤ)
10. u ≤ x
11. no_repeats(T;s-insert(x;v))
⊢ ¬(u ∈ s-insert(x;v))
BY
{ ((ParallelOp (-3)) THEN (RWO "member-s-insert" (-1)) THEN Auto THEN (D (-1)) THEN Auto) }

1
1. T : Type
2. T ⊆r ℤ
3. x : T
4. u : T
5. v : T List
6. (no_repeats(T;s-insert(x;v))) supposing (no_repeats(T;v) and sorted(v))
7. sorted([u / v])
8. no_repeats(T;[u / v])
9. u ≤ x
10. no_repeats(T;s-insert(x;v))
11. (u ∈ v)
⊢ x = u ∈ ℤ

Latex:

Latex:
1. T : Type 2. T \msubseteq{}r \mBbbZ{} 3. x : T 4. u : T 5. v : T List 6. (no\_repeats(T;s-insert(x;v))) supposing (no\_repeats(T;v) and sorted(v)) 7. sorted([u / v]) 8. no\_repeats(T;[u / v]) 9. \mneg{}(x = u) 10. u \mleq{} x 11. no\_repeats(T;s-insert(x;v)) \mvdash{} \mneg{}(u \mmember{} s-insert(x;v)) By Latex: ((ParallelOp (-3)) THEN (RWO "member-s-insert" (-1)) THEN Auto THEN (D (-1)) THEN Auto) Home Index