Proof of Nuprl Lemma : map

Step * 2 of Lemma map_functionality

1. T : Type
2. A : Type
3. L1 : T List
4. L2 : T List
5. f : {x:T| (x ∈ L1)}  ⟶ A
6. g : {x:T| (x ∈ L1)}  ⟶ A
7. L1 = L2 ∈ (T List)
8. f = g ∈ ({x:T| (x ∈ L1)}  ⟶ A)
9. as : {x:T| (x ∈ L1)}  List
10. L1 = as ∈ ({x:T| (x ∈ L1)}  List)
11. bs : {x:T| (x ∈ L1)}  List
12. L2 = bs ∈ ({x:T| (x ∈ L1)}  List)
⊢ map(f;as) = map(g;bs) ∈ (A List)
BY
{ (EqCD THEN Auto) }

1
.....subterm..... T:t
2:n
1. T : Type
2. A : Type
3. L1 : T List
4. L2 : T List
5. f : {x:T| (x ∈ L1)}  ⟶ A
6. g : {x:T| (x ∈ L1)}  ⟶ A
7. L1 = L2 ∈ (T List)
8. f = g ∈ ({x:T| (x ∈ L1)}  ⟶ A)
9. as : {x:T| (x ∈ L1)}  List
10. L1 = as ∈ ({x:T| (x ∈ L1)}  List)
11. bs : {x:T| (x ∈ L1)}  List
12. L2 = bs ∈ ({x:T| (x ∈ L1)}  List)
⊢ as = bs ∈ ({x:T| (x ∈ L1)}  List)

Latex:

Latex:
1. T : Type 2. A : Type 3. L1 : T List 4. L2 : T List 5. f : \{x:T| (x \mmember{} L1)\} {}\mrightarrow{} A 6. g : \{x:T| (x \mmember{} L1)\} {}\mrightarrow{} A 7. L1 = L2 8. f = g 9. as : \{x:T| (x \mmember{} L1)\} List 10. L1 = as 11. bs : \{x:T| (x \mmember{} L1)\} List 12. L2 = bs \mvdash{} map(f;as) = map(g;bs) By Latex: (EqCD THEN Auto) Home Index