Proof of Nuprl Lemma : fset-size-one

Step * 2 2 1 of Lemma fset-size-one

1. T : Type
2. eq : EqDecider(T)
3. istype(T List)
4. ∀x1,y:T List.  istype(set-equal(T;x1;y))
5. ∀x1:T List. set-equal(T;x1;x1)
6. a : Base
7. b : Base
8. c : a = b ∈ pertype(λx,y. ((x ∈ T List) ∧ (y ∈ T List) ∧ set-equal(T;x;y)))
9. a ∈ T List
10. b ∈ T List
11. set-equal(T;a;b)
12. x : T
13. (x ∈ a)
14. ∀y:T. y = x ∈ T supposing (y ∈ a)
⊢ (x ∈ b) ∧ (∀y:T. y = x ∈ T supposing (y ∈ b))
BY
{ D 0 }

1
1. T : Type
2. eq : EqDecider(T)
3. istype(T List)
4. ∀x1,y:T List.  istype(set-equal(T;x1;y))
5. ∀x1:T List. set-equal(T;x1;x1)
6. a : Base
7. b : Base
8. c : a = b ∈ pertype(λx,y. ((x ∈ T List) ∧ (y ∈ T List) ∧ set-equal(T;x;y)))
9. a ∈ T List
10. b ∈ T List
11. set-equal(T;a;b)
12. x : T
13. (x ∈ a)
14. ∀y:T. y = x ∈ T supposing (y ∈ a)
⊢ (x ∈ b)

2
1. T : Type
2. eq : EqDecider(T)
3. istype(T List)
4. ∀x1,y:T List.  istype(set-equal(T;x1;y))
5. ∀x1:T List. set-equal(T;x1;x1)
6. a : Base
7. b : Base
8. c : a = b ∈ pertype(λx,y. ((x ∈ T List) ∧ (y ∈ T List) ∧ set-equal(T;x;y)))
9. a ∈ T List
10. b ∈ T List
11. set-equal(T;a;b)
12. x : T
13. (x ∈ a)
14. ∀y:T. y = x ∈ T supposing (y ∈ a)
⊢ ∀y:T. y = x ∈ T supposing (y ∈ b)

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. istype(T List) 4. \mforall{}x1,y:T List. istype(set-equal(T;x1;y)) 5. \mforall{}x1:T List. set-equal(T;x1;x1) 6. a : Base 7. b : Base 8. c : a = b 9. a \mmember{} T List 10. b \mmember{} T List 11. set-equal(T;a;b) 12. x : T 13. (x \mmember{} a) 14. \mforall{}y:T. y = x supposing (y \mmember{} a) \mvdash{} (x \mmember{} b) \mwedge{} (\mforall{}y:T. y = x supposing (y \mmember{} b)) By Latex: D 0 Home Index