Proof of Nuprl Lemma : bag-summation-partition

Step * 2 1 2 1 2 2 1 1 1 of Lemma bag-summation-partition

1. A : Type
2. ∀x,y:A.  Dec(x = y ∈ A)
3. R : Type
4. T : Type
5. add : R ⟶ R ⟶ R
6. zero : R
7. case : T ⟶ A ⟶ 𝔹
8. f : T ⟶ R
9. c : bag(A)
10. IsMonoid(R;add;zero)
11. Comm(R;add)
12. bag-no-repeats(A;c)
13. ∀z1,z2:A. ∀x:T.  ((↑case[x;z1]) ⇒ (↑case[x;z2]) ⇒ (z1 = z2 ∈ A))
14. u : T
15. v : T List
16. ∀x:{x:T| x ↓∈ [u / v]} . (∃z:{A| (z ↓∈ c ∧ (↑case[x;z]))})
⊢ f[u] = Σ(z@0∈c). if case[u;z@0] then f[u] else zero fi  ∈ R
BY

{ ((InstHyp [⌜u⌝] (-1)⋅ THENA (Auto THEN MemTypeCD THEN Auto THEN BagMemberD 0 THEN D 0 THEN Auto))

   THEN D -1
   THEN ThinVar `v') }

1
1. A : Type
2. ∀x,y:A.  Dec(x = y ∈ A)
3. R : Type
4. T : Type
5. add : R ⟶ R ⟶ R
6. zero : R
7. case : T ⟶ A ⟶ 𝔹
8. f : T ⟶ R
9. c : bag(A)
10. IsMonoid(R;add;zero)
11. Comm(R;add)
12. bag-no-repeats(A;c)
13. ∀z1,z2:A. ∀x:T.  ((↑case[x;z1]) ⇒ (↑case[x;z2]) ⇒ (z1 = z2 ∈ A))
14. u : T
15. z : A
16. z ↓∈ c ∧ (↑case[u;z])
⊢ f[u] = Σ(z@0∈c). if case[u;z@0] then f[u] else zero fi  ∈ R

Latex:

Latex:
1. A : Type 2. \mforall{}x,y:A. Dec(x = y) 3. R : Type 4. T : Type 5. add : R {}\mrightarrow{} R {}\mrightarrow{} R 6. zero : R 7. case : T {}\mrightarrow{} A {}\mrightarrow{} \mBbbB{} 8. f : T {}\mrightarrow{} R 9. c : bag(A) 10. IsMonoid(R;add;zero) 11. Comm(R;add) 12. bag-no-repeats(A;c) 13. \mforall{}z1,z2:A. \mforall{}x:T. ((\muparrow{}case[x;z1]) {}\mRightarrow{} (\muparrow{}case[x;z2]) {}\mRightarrow{} (z1 = z2)) 14. u : T 15. v : T List 16. \mforall{}x:\{x:T| x \mdownarrow{}\mmember{} [u / v]\} . (\mexists{}z:\{A| (z \mdownarrow{}\mmember{} c \mwedge{} (\muparrow{}case[x;z]))\}) \mvdash{} f[u] = \mSigma{}(z@0\mmember{}c). if case[u;z@0] then f[u] else zero fi By Latex: ((InstHyp [\mkleeneopen{}u\mkleeneclose{}] (-1)\mcdot{} THENA (Auto THEN MemTypeCD THEN Auto THEN BagMemberD 0 THEN D 0 THEN Auto)) THEN D -1 THEN ThinVar `v') Home Index