Proof of Nuprl Lemma : Legendre-annihilates-rpolynomial

Step * 2 1 1 of Lemma Legendre-annihilates-rpolynomial

1. n : ℕ
2. f : [r(-1), r1] ⟶ℝ
3. k : ℕn
4. a : ℕk + 1 ⟶ ℝ
5. ∀x:{x:ℝ| x ∈ [r(-1), r1]} . ((f x) = (Σi≤k. a_i * x^i))

6. λx.((f x) * Legendre(n;x)) ∈ {f:[rmin(r(-1);r1), rmax(r(-1);r1)] ⟶ℝ| ifun(f;[rmin(r(-1);r1), rmax(r(-1);r1)])}

7. r(-1)_∫^-r1 (Σi≤k. a_i * x^i) * Legendre(n;x) dx = r0
8. x : {x:ℝ| x ∈ [rmin(r(-1);r1), rmax(r(-1);r1)]}
9. y : {x:ℝ| x ∈ [rmin(r(-1);r1), rmax(r(-1);r1)]}
10. x = y
⊢ ((Σi≤k. a_i * x^i) * Legendre(n;y)) = ((Σi≤k. a_i * y^i) * Legendre(n;y))
BY

{ (BLemma `rmul_functionality` THEN Auto THEN BLemma `rpolynomial_functionality` THEN Auto THEN D 0 THEN Auto) }

Latex:

Latex:
1. n : \mBbbN{} 2. f : [r(-1), r1] {}\mrightarrow{}\mBbbR{} 3. k : \mBbbN{}n 4. a : \mBbbN{}k + 1 {}\mrightarrow{} \mBbbR{} 5. \mforall{}x:\{x:\mBbbR{}| x \mmember{} [r(-1), r1]\} . ((f x) = (\mSigma{}i\mleq{}k. a\_i * x\^{}i)) 6. \mlambda{}x.((f x) * Legendre(n;x)) \mmember{} \{f:[rmin(r(-1);r1), rmax(r(-1);r1)] {}\mrightarrow{}\mBbbR{}| ifun(f;[rmin(r(-1);r1), rmax(r(-1);r1)])\} 7. r(-1)\_\mint{}\msupminus{}r1 (\mSigma{}i\mleq{}k. a\_i * x\^{}i) * Legendre(n;x) dx = r0 8. x : \{x:\mBbbR{}| x \mmember{} [rmin(r(-1);r1), rmax(r(-1);r1)]\} 9. y : \{x:\mBbbR{}| x \mmember{} [rmin(r(-1);r1), rmax(r(-1);r1)]\} 10. x = y \mvdash{} ((\mSigma{}i\mleq{}k. a\_i * x\^{}i) * Legendre(n;y)) = ((\mSigma{}i\mleq{}k. a\_i * y\^{}i) * Legendre(n;y)) By Latex: (BLemma `rmul\_functionality` THEN Auto THEN BLemma `rpolynomial\_functionality` THEN Auto THEN D 0 THEN Auto) Home Index