Proof of Nuprl Lemma : bag-intersection

Step * 2 1 of Lemma bag-intersection

.....assertion.....
1. A : Type
2. as : A List
3. as' : A List
4. bs : A List
5. bs' : A List

6. (as @ as') = (bs @ bs') ∈ pertype(λas,bs. ((as ∈ A List) ∧ (bs ∈ A List) ∧ permutation(A;as;bs)))

7. as @ as' ∈ A List
8. bs @ bs' ∈ A List
9. permutation(A;as @ as';bs @ bs')
10. ||bs'|| < ||bs||
11. ||as'|| < ||as||
12. f : ℕ||as @ as'|| ⟶ ℕ||as @ as'||
13. Inj(ℕ||as @ as'||;ℕ||as @ as'||;f)
14. (bs @ bs') = (as @ as' o f) ∈ (A List)
15. ||as @ as'|| = ||bs @ bs'|| ∈ ℤ
16. ¬(∃i:ℕ||bs||. f[i] < ||as||)
⊢ False
BY
{ (RWO "not_over_exists" (-1) THENA (Auto THEN HypSubst' (-3) 0 THEN All Thin THEN Auto')) }

1
1. A : Type
2. as : A List
3. as' : A List
4. bs : A List
5. bs' : A List

6. (as @ as') = (bs @ bs') ∈ pertype(λas,bs. ((as ∈ A List) ∧ (bs ∈ A List) ∧ permutation(A;as;bs)))

Latex:

Latex:
.....assertion..... 1. A : Type 2. as : A List 3. as' : A List 4. bs : A List 5. bs' : A List 6. (as @ as') = (bs @ bs') 7. as @ as' \mmember{} A List 8. bs @ bs' \mmember{} A List 9. permutation(A;as @ as';bs @ bs') 10. ||bs'|| < ||bs|| 11. ||as'|| < ||as|| 12. f : \mBbbN{}||as @ as'|| {}\mrightarrow{} \mBbbN{}||as @ as'|| 13. Inj(\mBbbN{}||as @ as'||;\mBbbN{}||as @ as'||;f) 14. (bs @ bs') = (as @ as' o f) 15. ||as @ as'|| = ||bs @ bs'|| 16. \mneg{}(\mexists{}i:\mBbbN{}||bs||. f[i] < ||as||) \mvdash{} False By Latex: (RWO "not\_over\_exists" (-1) THENA (Auto THEN HypSubst' (-3) 0 THEN All Thin THEN Auto')) Home Index