Proof of Nuprl Lemma : assert_of_eq

Step * 1 1 1 1 2 1 of Lemma assert_of_eq_mset

1. s : DSet@i'
2. a : Base
3. a1 : Base
4. a = a1 ∈ pertype(λas,bs. ((as ∈ |s| List) ∧ (bs ∈ |s| List) ∧ (as ≡(|s|) bs)))
5. a ∈ |s| List
6. a1 ∈ |s| List
7. a ≡(|s|) a1
8. b : Base
9. b1 : Base
10. b = b1 ∈ pertype(λas,bs. ((as ∈ |s| List) ∧ (bs ∈ |s| List) ∧ (as ≡(|s|) bs)))
11. b ∈ |s| List
12. b1 ∈ |s| List
13. b ≡(|s|) b1
14. a = b ∈ pertype(λas,bs. ((as ∈ |s| List) ∧ (bs ∈ |s| List) ∧ (as ≡(|s|) bs)))
15. [%13] : (a ∈ |s| List) ∧ (b ∈ |s| List) ∧ (a ≡(|s|) b)
⊢ ↑(a ≡_b b)
BY
{ (Unhide THEN Auto) }

1
1. s : DSet@i'
2. a : Base
3. a1 : Base
4. a = a1 ∈ pertype(λas,bs. ((as ∈ |s| List) ∧ (bs ∈ |s| List) ∧ (as ≡(|s|) bs)))
5. a ∈ |s| List
6. a1 ∈ |s| List
7. a ≡(|s|) a1
8. b : Base
9. b1 : Base
10. b = b1 ∈ pertype(λas,bs. ((as ∈ |s| List) ∧ (bs ∈ |s| List) ∧ (as ≡(|s|) bs)))
11. b ∈ |s| List
12. b1 ∈ |s| List
13. b ≡(|s|) b1
14. a = b ∈ pertype(λas,bs. ((as ∈ |s| List) ∧ (bs ∈ |s| List) ∧ (as ≡(|s|) bs)))
15. a ∈ |s| List
16. b ∈ |s| List
17. a ≡(|s|) b
⊢ ↑(a ≡_b b)

Latex:

Latex:
1. s : DSet@i' 2. a : Base 3. a1 : Base 4. a = a1 5. a \mmember{} |s| List 6. a1 \mmember{} |s| List 7. a \mequiv{}(|s|) a1 8. b : Base 9. b1 : Base 10. b = b1 11. b \mmember{} |s| List 12. b1 \mmember{} |s| List 13. b \mequiv{}(|s|) b1 14. a = b 15. [\%13] : (a \mmember{} |s| List) \mwedge{} (b \mmember{} |s| List) \mwedge{} (a \mequiv{}(|s|) b) \mvdash{} \muparrow{}(a \mequiv{}\msubb{} b) By Latex: (Unhide THEN Auto) Home Index