Proof of Nuprl Lemma : sv-bag-is-bag-rep-lousy-proof

Step * 1 1 1 1 1 of Lemma sv-bag-is-bag-rep-lousy-proof

1. A : Type
2. as : bag(A)
3. single-valued-bag(as;A)
4. a : A@i
5. (a ∈ as)
6. single-valued-list(as;A)
7. as ∈ A List
8. single-valued-bag(bag-rep(#(as);a);A)
9. bag-rep(#(as);a) ∈ A List
10. single-valued-list(bag-rep(#(as);a);A)
11. x : A@i
12. (x ∈ bag-rep(#(as);a))@i
⊢ x = a ∈ A
BY
{ Assert ⌜a ↓∈ bag-rep(#(as);a)⌝⋅ }

1
.....assertion.....
1. A : Type
2. as : bag(A)
3. single-valued-bag(as;A)
4. a : A@i
5. (a ∈ as)
6. single-valued-list(as;A)
7. as ∈ A List
8. single-valued-bag(bag-rep(#(as);a);A)
9. bag-rep(#(as);a) ∈ A List
10. single-valued-list(bag-rep(#(as);a);A)
11. x : A@i
12. (x ∈ bag-rep(#(as);a))@i
⊢ a ↓∈ bag-rep(#(as);a)

2
1. A : Type
2. as : bag(A)
3. single-valued-bag(as;A)
4. a : A@i
5. (a ∈ as)
6. single-valued-list(as;A)
7. as ∈ A List
8. single-valued-bag(bag-rep(#(as);a);A)
9. bag-rep(#(as);a) ∈ A List
10. single-valued-list(bag-rep(#(as);a);A)
11. x : A@i
12. (x ∈ bag-rep(#(as);a))@i
13. a ↓∈ bag-rep(#(as);a)
⊢ x = a ∈ A

Latex:

Latex:
1. A : Type 2. as : bag(A) 3. single-valued-bag(as;A) 4. a : A@i 5. (a \mmember{} as) 6. single-valued-list(as;A) 7. as \mmember{} A List 8. single-valued-bag(bag-rep(\#(as);a);A) 9. bag-rep(\#(as);a) \mmember{} A List 10. single-valued-list(bag-rep(\#(as);a);A) 11. x : A@i 12. (x \mmember{} bag-rep(\#(as);a))@i \mvdash{} x = a By Latex: Assert \mkleeneopen{}a \mdownarrow{}\mmember{} bag-rep(\#(as);a)\mkleeneclose{}\mcdot{} Home Index