Proof of Nuprl Lemma : bag-summation-linear-right

Step * 1 2 1 of Lemma bag-summation-linear-right

1. T : Type
2. R : Type
3. add : R ⟶ R ⟶ R
4. mul : R ⟶ R ⟶ R
5. zero : R
6. f : T ⟶ R
7. g : T ⟶ R
8. minus : R ⟶ R
9. IsGroup(R;add;zero;minus)
10. Comm(R;add)
11. BiLinear(R;add;mul)
12. a : R
13. L : T List
14. ∀x,y,z:R.
      ((z = mul[add[x;y];a] ∈ R)
      ⇒ (accumulate (with value c and list item x):
           add mul[add[f[x];g[x]];a] c
          over list:
            L
          with starting value:
           z)
         = mul[add[accumulate (with value c and list item x):
                    add f[x] c
                   over list:
                     L
                   with starting value:
                    x);accumulate (with value c and list item x):
                        add g[x] c
                       over list:
                         L
                       with starting value:
                        y)];a]
         ∈ R))
⊢ zero = mul[add[zero;zero];a] ∈ R
BY
{ (RepUR ``so_apply`` 0 THEN Fold `infix_ap` 0 THEN Symmetry) }

1
1. T : Type
2. R : Type
3. add : R ⟶ R ⟶ R
4. mul : R ⟶ R ⟶ R
5. zero : R
6. f : T ⟶ R
7. g : T ⟶ R
8. minus : R ⟶ R
9. IsGroup(R;add;zero;minus)
10. Comm(R;add)
11. BiLinear(R;add;mul)
12. a : R
13. L : T List
14. ∀x,y,z:R.
      ((z = mul[add[x;y];a] ∈ R)
      ⇒ (accumulate (with value c and list item x):
           add mul[add[f[x];g[x]];a] c
          over list:
            L
          with starting value:
           z)
         = mul[add[accumulate (with value c and list item x):
                    add f[x] c
                   over list:
                     L
                   with starting value:
                    x);accumulate (with value c and list item x):
                        add g[x] c
                       over list:
                         L
                       with starting value:
                        y)];a]
         ∈ R))
⊢ ((zero add zero) mul a) = zero ∈ R

Latex:

Latex:
1. T : Type 2. R : Type 3. add : R {}\mrightarrow{} R {}\mrightarrow{} R 4. mul : R {}\mrightarrow{} R {}\mrightarrow{} R 5. zero : R 6. f : T {}\mrightarrow{} R 7. g : T {}\mrightarrow{} R 8. minus : R {}\mrightarrow{} R 9. IsGroup(R;add;zero;minus) 10. Comm(R;add) 11. BiLinear(R;add;mul) 12. a : R 13. L : T List 14. \mforall{}x,y,z:R. ((z = mul[add[x;y];a]) {}\mRightarrow{} (accumulate (with value c and list item x): add mul[add[f[x];g[x]];a] c over list: L with starting value: z) = mul[add[accumulate (with value c and list item x): add f[x] c over list: L with starting value: x);accumulate (with value c and list item x): add g[x] c over list: L with starting value: y)];a])) \mvdash{} zero = mul[add[zero;zero];a] By Latex: (RepUR ``so\_apply`` 0 THEN Fold `infix\_ap` 0 THEN Symmetry) Home Index