Proof of Nuprl Lemma : rng

Step * 1 1 2 1 1 of Lemma rng_lsum-partition

1. k : ℕ
2. A : Type
3. p : A ⟶ ℕk
4. r : Rng
5. f : A ⟶ |r|
6. u : A
7. m : ℤ
8. 0 < m
9. m < k
10. f[u] = (Σ(r) 0 ≤ i < k. if (m - 1 =_z i) then f[u] else 0 fi ) ∈ |r|
11. (Σ(r) 0
          ≤ j
          < k
      if (m - 1 =_z j) then f[u] else 0 fi )
= (Σ(r) 0 + 1
        ≤ j
        < k + 1
    if (m - 1 =_z j - 1) then f[u] else 0 fi )
∈ |r|
⊢ f[u] = (Σ(r) 0 ≤ i < k. if (m =_z i) then f[u] else 0 fi ) ∈ |r|
BY
{ ((RWO "-1" (-2) THENA Auto) THEN Thin (-1)) }

1
1. k : ℕ
2. A : Type
3. p : A ⟶ ℕk
4. r : Rng
5. f : A ⟶ |r|
6. u : A
7. m : ℤ
8. 0 < m
9. m < k
10. f[u] = (Σ(r) 0 + 1 ≤ i < k + 1. if (m - 1 =_z i - 1) then f[u] else 0 fi ) ∈ |r|
⊢ f[u] = (Σ(r) 0 ≤ i < k. if (m =_z i) then f[u] else 0 fi ) ∈ |r|

Latex:

Latex:
1. k : \mBbbN{} 2. A : Type 3. p : A {}\mrightarrow{} \mBbbN{}k 4. r : Rng 5. f : A {}\mrightarrow{} |r| 6. u : A 7. m : \mBbbZ{} 8. 0 < m 9. m < k 10. f[u] = (\mSigma{}(r) 0 \mleq{} i < k. if (m - 1 =\msubz{} i) then f[u] else 0 fi ) 11. (\mSigma{}(r) 0 \mleq{} j < k if (m - 1 =\msubz{} j) then f[u] else 0 fi ) = (\mSigma{}(r) 0 + 1 \mleq{} j < k + 1 if (m - 1 =\msubz{} j - 1) then f[u] else 0 fi ) \mvdash{} f[u] = (\mSigma{}(r) 0 \mleq{} i < k. if (m =\msubz{} i) then f[u] else 0 fi ) By Latex: ((RWO "-1" (-2) THENA Auto) THEN Thin (-1)) Home Index