Proof of Nuprl Lemma : rsum-as-itop

Step * 1 2 1 of Lemma rsum-as-itop

1. n : ℤ
2. m : ℤ
3. x : {n..m^-} ⟶ ℝ
4. n < m
5. d : ℤ
6. 0 < d

7. ∀n:ℤ. ∀x:{n..n + (d - 1) + 1^-} ⟶ ℝ.  (Π(λx,y. (x + y),r0) n ≤ k < n + (d - 1) + 1. x[k] = Σ{x[k] | n≤k≤n + (d - 1)})

8. n1 : ℤ
9. x1 : {n1..n1 + d + 1^-} ⟶ ℝ
⊢ (Π(λx,y. (x + y),r0) n1 ≤ k < n1 + (d - 1) + 1. x1[k] + x1[n1 + (d - 1) + 1])
= (Σ{x1[k] | n1≤k≤(n1 + d) - 1} + x1[n1 + d])
BY
{ ((RWO "-3" 0 THEN Auto)
   THEN (Subst' n1 + (d - 1) ~ (n1 + d) - 1 0 THENA Auto)
   THEN Subst' (d - 1) + 1 ~ d 0
   THEN Auto) }

Latex:

Latex:
1. n : \mBbbZ{} 2. m : \mBbbZ{} 3. x : \{n..m\msupminus{}\} {}\mrightarrow{} \mBbbR{} 4. n < m 5. d : \mBbbZ{} 6. 0 < d 7. \mforall{}n:\mBbbZ{}. \mforall{}x:\{n..n + (d - 1) + 1\msupminus{}\} {}\mrightarrow{} \mBbbR{}. (\mPi{}(\mlambda{}x,y. (x + y),r0) n \mleq{} k < n + (d - 1) + 1. x[k] = \mSigma{}\{x[k] | n\mleq{}k\mleq{}n + (d - 1)\}) 8. n1 : \mBbbZ{} 9. x1 : \{n1..n1 + d + 1\msupminus{}\} {}\mrightarrow{} \mBbbR{} \mvdash{} (\mPi{}(\mlambda{}x,y. (x + y),r0) n1 \mleq{} k < n1 + (d - 1) + 1. x1[k] + x1[n1 + (d - 1) + 1]) = (\mSigma{}\{x1[k] | n1\mleq{}k\mleq{}(n1 + d) - 1\} + x1[n1 + d]) By Latex: ((RWO "-3" 0 THEN Auto) THEN (Subst' n1 + (d - 1) \msim{} (n1 + d) - 1 0 THENA Auto) THEN Subst' (d - 1) + 1 \msim{} d 0 THEN Auto) Home Index