Proof of Nuprl Lemma : double_sum

Step * 1 1 1 of Lemma double_sum_difference

1. n : ℕ
2. m : ℕ
3. f : ℕn ⟶ ℕm ⟶ ℤ
4. g : ℕn ⟶ ℕm ⟶ ℤ
5. d : ℤ
6. Σ(Σ(f[x;y] - g[x;y] | y < m) | x < n) = d ∈ ℤ
⊢ Σ(Σ(f[x;y] | y < m) - Σ(g[x;y] | y < m) | x < n) = d ∈ ℤ
BY
{ ((RevHypSubstSq (-1) 0 THEN BackThruLemma `sum_functionality`) THEN Auto) }

1
1. n : ℕ
2. m : ℕ
3. f : ℕn ⟶ ℕm ⟶ ℤ
4. g : ℕn ⟶ ℕm ⟶ ℤ
5. d : ℤ
6. Σ(Σ(f[x;y] - g[x;y] | y < m) | x < n) = d ∈ ℤ
7. i : ℕn
⊢ (Σ(f[i;y] | y < m) - Σ(g[i;y] | y < m)) = Σ(f[i;y] - g[i;y] | y < m) ∈ ℤ

Latex:

Latex:
1. n : \mBbbN{} 2. m : \mBbbN{} 3. f : \mBbbN{}n {}\mrightarrow{} \mBbbN{}m {}\mrightarrow{} \mBbbZ{} 4. g : \mBbbN{}n {}\mrightarrow{} \mBbbN{}m {}\mrightarrow{} \mBbbZ{} 5. d : \mBbbZ{} 6. \mSigma{}(\mSigma{}(f[x;y] - g[x;y] | y < m) | x < n) = d \mvdash{} \mSigma{}(\mSigma{}(f[x;y] | y < m) - \mSigma{}(g[x;y] | y < m) | x < n) = d By Latex: ((RevHypSubstSq (-1) 0 THEN BackThruLemma `sum\_functionality`) THEN Auto) Home Index