Proof of Nuprl Lemma : permutation-sorted-by-unique

Step * 2 of Lemma permutation-sorted-by-unique

1. T : Type
2. R : T ⟶ T ⟶ ℙ
3. Linorder(T;a,b.R a b)
4. u : T
5. v : T List

6. ∀[sb:T List]. (v = sb ∈ (T List)) supposing (sorted-by(R;v) and sorted-by(R;sb) and permutation(T;v;sb))

⊢ ∀[sb:T List]

    ([u / v] = sb ∈ (T List)) supposing (sorted-by(R;[u / v]) and sorted-by(R;sb) and permutation(T;[u / v];sb))

BY
{ (InductionOnList THENA Auto)⋅ }

1
1. T : Type
2. R : T ⟶ T ⟶ ℙ
3. Linorder(T;a,b.R a b)
4. u : T
5. v : T List

6. ∀[sb:T List]. (v = sb ∈ (T List)) supposing (sorted-by(R;v) and sorted-by(R;sb) and permutation(T;v;sb))

⊢ ([u / v] = [] ∈ (T List)) supposing (sorted-by(R;[u / v]) and sorted-by(R;[]) and permutation(T;[u / v];[]))

2
1. T : Type
2. R : T ⟶ T ⟶ ℙ
3. Linorder(T;a,b.R a b)
4. u : T
5. v : T List

6. ∀[sb:T List]. (v = sb ∈ (T List)) supposing (sorted-by(R;v) and sorted-by(R;sb) and permutation(T;v;sb))

7. u1 : T
8. v1 : T List

9. ([u / v] = v1 ∈ (T List)) supposing (sorted-by(R;[u / v]) and sorted-by(R;v1) and permutation(T;[u / v];v1))

⊢ ([u / v] = [u1 / v1] ∈ (T List)) supposing
     (sorted-by(R;[u / v]) and
     sorted-by(R;[u1 / v1]) and
     permutation(T;[u / v];[u1 / v1]))

Latex:

Latex:
1. T : Type 2. R : T {}\mrightarrow{} T {}\mrightarrow{} \mBbbP{} 3. Linorder(T;a,b.R a b) 4. u : T 5. v : T List 6. \mforall{}[sb:T List]. (v = sb) supposing (sorted-by(R;v) and sorted-by(R;sb) and permutation(T;v;sb)) \mvdash{} \mforall{}[sb:T List] ([u / v] = sb) supposing (sorted-by(R;[u / v]) and sorted-by(R;sb) and permutation(T;[u / v];sb)) By Latex: (InductionOnList THENA Auto)\mcdot{} Home Index