Proof of Nuprl Lemma : polynom-equal-iff

Step * 1 2 2 1 2 2 2 of Lemma polynom-equal-iff

1. n : ℤ
2. 0 < n
3. ∀p,q:polynom(n - 1).
     ((↑poly-zero(n - 1;add-polynom(n - 1;tt;p;minus-polynom(n - 1;q)))) ⇒ (p = q ∈ polynom(n - 1)))
4. p : polynom(n - 1) List
5. q : polynom(n - 1) List
6. ↑poly-zero(n;add-polynom(n;tt;p;minus-polynom(n;q)))
7. p ∈ polynom(n)
8. q ∈ polynom(n)
9. 0 < ||p|| ⇒ (¬↑poly-zero(n - 1;hd(p)))
10. 0 < ||q|| ⇒ (¬↑poly-zero(n - 1;hd(q)))
11. ∀q:polynom(n). (||minus-polynom(n;q)|| = ||q|| ∈ ℤ)
12. ||p|| = ||q|| ∈ ℤ
13. ∀p,q:polynom(n - 1) List. ∀rmz:𝔹.  (poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q))) ∈ 𝔹)
⊢ p = q ∈ (polynom(n - 1) List)
BY
{ Assert ⌜∀k:ℕ. ∀p,q:polynom(n - 1) List. ∀rmz:𝔹.
            ((||p|| ≤ k)
            ⇒ (||p|| = ||q|| ∈ ℤ)
            ⇒ (↑poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q))))
            ⇒ (p = q ∈ (polynom(n - 1) List)))⌝⋅ }

1
.....assertion.....
1. n : ℤ
2. 0 < n
3. ∀p,q:polynom(n - 1).
     ((↑poly-zero(n - 1;add-polynom(n - 1;tt;p;minus-polynom(n - 1;q)))) ⇒ (p = q ∈ polynom(n - 1)))
4. p : polynom(n - 1) List
5. q : polynom(n - 1) List
6. ↑poly-zero(n;add-polynom(n;tt;p;minus-polynom(n;q)))
7. p ∈ polynom(n)
8. q ∈ polynom(n)
9. 0 < ||p|| ⇒ (¬↑poly-zero(n - 1;hd(p)))
10. 0 < ||q|| ⇒ (¬↑poly-zero(n - 1;hd(q)))
11. ∀q:polynom(n). (||minus-polynom(n;q)|| = ||q|| ∈ ℤ)
12. ||p|| = ||q|| ∈ ℤ
13. ∀p,q:polynom(n - 1) List. ∀rmz:𝔹.  (poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q))) ∈ 𝔹)
⊢ ∀k:ℕ. ∀p,q:polynom(n - 1) List. ∀rmz:𝔹.
    ((||p|| ≤ k)
    ⇒ (||p|| = ||q|| ∈ ℤ)
    ⇒ (↑poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q))))
    ⇒ (p = q ∈ (polynom(n - 1) List)))

2
1. n : ℤ
2. 0 < n
3. ∀p,q:polynom(n - 1).
     ((↑poly-zero(n - 1;add-polynom(n - 1;tt;p;minus-polynom(n - 1;q)))) ⇒ (p = q ∈ polynom(n - 1)))
4. p : polynom(n - 1) List
5. q : polynom(n - 1) List
6. ↑poly-zero(n;add-polynom(n;tt;p;minus-polynom(n;q)))
7. p ∈ polynom(n)
8. q ∈ polynom(n)
9. 0 < ||p|| ⇒ (¬↑poly-zero(n - 1;hd(p)))
10. 0 < ||q|| ⇒ (¬↑poly-zero(n - 1;hd(q)))
11. ∀q:polynom(n). (||minus-polynom(n;q)|| = ||q|| ∈ ℤ)
12. ||p|| = ||q|| ∈ ℤ
13. ∀p,q:polynom(n - 1) List. ∀rmz:𝔹.  (poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q))) ∈ 𝔹)
14. ∀k:ℕ. ∀p,q:polynom(n - 1) List. ∀rmz:𝔹.
      ((||p|| ≤ k)
      ⇒ (||p|| = ||q|| ∈ ℤ)
      ⇒ (↑poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q))))
      ⇒ (p = q ∈ (polynom(n - 1) List)))
⊢ p = q ∈ (polynom(n - 1) List)

Latex:

Latex:
1. n : \mBbbZ{} 2. 0 < n 3. \mforall{}p,q:polynom(n - 1). ((\muparrow{}poly-zero(n - 1;add-polynom(n - 1;tt;p;minus-polynom(n - 1;q)))) {}\mRightarrow{} (p = q)) 4. p : polynom(n - 1) List 5. q : polynom(n - 1) List 6. \muparrow{}poly-zero(n;add-polynom(n;tt;p;minus-polynom(n;q))) 7. p \mmember{} polynom(n) 8. q \mmember{} polynom(n) 9. 0 < ||p|| {}\mRightarrow{} (\mneg{}\muparrow{}poly-zero(n - 1;hd(p))) 10. 0 < ||q|| {}\mRightarrow{} (\mneg{}\muparrow{}poly-zero(n - 1;hd(q))) 11. \mforall{}q:polynom(n). (||minus-polynom(n;q)|| = ||q||) 12. ||p|| = ||q|| 13. \mforall{}p,q:polynom(n - 1) List. \mforall{}rmz:\mBbbB{}. (poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q))) \mmember{} \mBbbB{}) \mvdash{} p = q By Latex: Assert \mkleeneopen{}\mforall{}k:\mBbbN{}. \mforall{}p,q:polynom(n - 1) List. \mforall{}rmz:\mBbbB{}. ((||p|| \mleq{} k) {}\mRightarrow{} (||p|| = ||q||) {}\mRightarrow{} (\muparrow{}poly-zero(n;add-polynom(n;rmz;p;minus-polynom(n;q)))) {}\mRightarrow{} (p = q))\mkleeneclose{}\mcdot{} Home Index