Proof of Nuprl Lemma : in-simple-loc-comb-1-concat

Step * 1 1 1 1 1 1 of Lemma in-simple-loc-comb-1-concat

1. Info : Type
2. A : Type
3. B : Type
4. f : Id ─→ A ─→ bag(B)
5. X : EClass(A)
6. es : EO+(Info)
7. e : E
8. ∀i:Id. ∀a:A.  (#(f i a) ≤ 1)@i
9. ∀e:E. (#(X es e) ≤ 1)@i'
10. #(X es e) ≤ 1@i
11. #(X es e) = 1 ∈ ℤ
⊢ (#(bag-union(∪x∈X es e.{f loc(e) x})) =_z 1) = ¬_bbag-null(f loc(e) X(e))
BY
{ Subst ⌈X es e ~ {X(e)}⌉ 0⋅ }

1
.....equality.....
1. Info : Type
2. A : Type
3. B : Type
4. f : Id ─→ A ─→ bag(B)
5. X : EClass(A)
6. es : EO+(Info)
7. e : E
8. ∀i:Id. ∀a:A.  (#(f i a) ≤ 1)@i
9. ∀e:E. (#(X es e) ≤ 1)@i'
10. #(X es e) ≤ 1@i
11. #(X es e) = 1 ∈ ℤ
⊢ X es e ~ {X(e)}

2
1. Info : Type
2. A : Type
3. B : Type
4. f : Id ─→ A ─→ bag(B)
5. X : EClass(A)
6. es : EO+(Info)
7. e : E
8. ∀i:Id. ∀a:A.  (#(f i a) ≤ 1)@i
9. ∀e:E. (#(X es e) ≤ 1)@i'
10. #(X es e) ≤ 1@i
11. #(X es e) = 1 ∈ ℤ
⊢ (#(bag-union(∪x∈{X(e)}.{f loc(e) x})) =_z 1) = ¬_bbag-null(f loc(e) X(e))

Latex:

Latex:
1. Info : Type 2. A : Type 3. B : Type 4. f : Id {}\mrightarrow{} A {}\mrightarrow{} bag(B) 5. X : EClass(A) 6. es : EO+(Info) 7. e : E 8. \mforall{}i:Id. \mforall{}a:A. (\#(f i a) \mleq{} 1)@i 9. \mforall{}e:E. (\#(X es e) \mleq{} 1)@i' 10. \#(X es e) \mleq{} 1@i 11. \#(X es e) = 1 \mvdash{} (\#(bag-union(\mcup{}x\mmember{}X es e.\{f loc(e) x\})) =\msubz{} 1) = \mneg{}\msubb{}bag-null(f loc(e) X(e)) By Latex: Subst \mkleeneopen{}X es e \msim{} \{X(e)\}\mkleeneclose{} 0\mcdot{} Home Index