Proof of Nuprl Lemma : mul-polynom

Step * 1 1 2 2 of Lemma mul-polynom_wf2

1. n : ℤ
2. 0 < n
3. ∀[p,q:polynom(n - 1)]. (mul-polynom(n - 1;p;q) ∈ polynom(n - 1))
4. ¬(n = 0 ∈ ℤ)
5. p : {p:polynom(n - 1) List| polyform-lead-nonzero(n;p)}
6. q : {p:polynom(n - 1) List| polyform-lead-nonzero(n;p)}
7. ¬(n = 0 ∈ ℤ)
8. ¬(n = 0 ∈ ℤ)
9. ∀z:polynom(n). (if null(z) then [] else z @ [polyconst(n - 1;0)] fi ∈ polynom(n))

10. ∀a:polynom(n - 1). (if poly-zero(n - 1;a) then [] else map(λx.mul-polynom(n - 1;a;x);q) fi  ∈ polynom(n))

⊢ eager-accum(z,a.add-polynom(n;tt;if null(z) then [] else z @ [polyconst(n - 1;0)] fi ;if poly-zero(n - 1;a)

  then []
  else map(λx.mul-polynom(n - 1;a;x);q)
  fi );polyconst(n;0);p) ∈ polynom(n)
BY
{ ((MemCD THEN Try (MemCD) THEN Try (BackThruSomeHyp)) THEN Auto) }

Latex:

Latex:
1. n : \mBbbZ{} 2. 0 < n 3. \mforall{}[p,q:polynom(n - 1)]. (mul-polynom(n - 1;p;q) \mmember{} polynom(n - 1)) 4. \mneg{}(n = 0) 5. p : \{p:polynom(n - 1) List| polyform-lead-nonzero(n;p)\} 6. q : \{p:polynom(n - 1) List| polyform-lead-nonzero(n;p)\} 7. \mneg{}(n = 0) 8. \mneg{}(n = 0) 9. \mforall{}z:polynom(n). (if null(z) then [] else z @ [polyconst(n - 1;0)] fi \mmember{} polynom(n)) 10. \mforall{}a:polynom(n - 1) (if poly-zero(n - 1;a) then [] else map(\mlambda{}x.mul-polynom(n - 1;a;x);q) fi \mmember{} polynom(n)) \mvdash{} eager-accum(z,a.add-polynom(n;tt;if null(z) then [] else z @ [polyconst(n - 1;0)] fi ;if poly-zero(n - 1;a) then [] else map(\mlambda{}x.mul-polynom(n - 1;a;x);q) fi );polyconst(n;0);p) \mmember{} polynom(n) By Latex: ((MemCD THEN Try (MemCD) THEN Try (BackThruSomeHyp)) THEN Auto) Home Index