Proof of Nuprl Lemma : cons-sub-co-list-cons

Step * 2 2 of Lemma cons-sub-co-list-cons

1. [T] : Type
2. x1 : T
3. x2 : T
4. L1 : colist(T)
5. L2 : colist(T)
6. ns : colist(ℕ)
7. [x1 / L1] = L2@ns ∈ colist(T)
⊢ sub-co-list(T;[x1 / L1];[x2 / L2])
BY
{ colistD (-2) }

1
1. [T] : Type
2. x1 : T
3. x2 : T
4. L1 : colist(T)
5. L2 : colist(T)
6. [x1 / L1] = L2@[] ∈ colist(T)
⊢ sub-co-list(T;[x1 / L1];[x2 / L2])

2
1. [T] : Type
2. x1 : T
3. x2 : T
4. L1 : colist(T)
5. L2 : colist(T)
6. u : ℕ
7. v : colist(ℕ)
8. [x1 / L1] = L2@[u / v] ∈ colist(T)
⊢ sub-co-list(T;[x1 / L1];[x2 / L2])

Latex:

Latex:
1. [T] : Type 2. x1 : T 3. x2 : T 4. L1 : colist(T) 5. L2 : colist(T) 6. ns : colist(\mBbbN{}) 7. [x1 / L1] = L2@ns \mvdash{} sub-co-list(T;[x1 / L1];[x2 / L2]) By Latex: colistD (-2) Home Index