Proof of Nuprl Lemma : co-cons_one

Step * 2 2 of Lemma co-cons_one_one

1. T : Type
2. a : T
3. a' : T
4. b : colist(T)
5. b' : colist(T)
6. [a / b] = [a' / b'] ∈ colist(T)

7. [a / b] = [a' / b'] ∈ {z:colist(T)| (z = [a / b] ∈ colist(T)) ∧ (z = [a' / b'] ∈ colist(T))}

8. tl([a / b]) = tl([a' / b']) ∈ colist(T)
⊢ b = b' ∈ colist(T)
BY
{ (RepUR ``co-cons`` -1 THEN Fold `cons` (-1) THEN Reduce -1) }

1
1. T : Type
2. a : T
3. a' : T
4. b : colist(T)
5. b' : colist(T)
6. [a / b] = [a' / b'] ∈ colist(T)

7. [a / b] = [a' / b'] ∈ {z:colist(T)| (z = [a / b] ∈ colist(T)) ∧ (z = [a' / b'] ∈ colist(T))}

8. b = b' ∈ colist(T)
⊢ b = b' ∈ colist(T)

Latex:

Latex:
1. T : Type 2. a : T 3. a' : T 4. b : colist(T) 5. b' : colist(T) 6. [a / b] = [a' / b'] 7. [a / b] = [a' / b'] 8. tl([a / b]) = tl([a' / b']) \mvdash{} b = b' By Latex: (RepUR ``co-cons`` -1 THEN Fold `cons` (-1) THEN Reduce -1) Home Index