Proof of Nuprl Lemma : add-ipoly-equiv

Step * 1 2 2 2 1 of Lemma add-ipoly-equiv

1. n : ℤ
2. 0 < n
3. ∀p,q:iMonomial() List.
     (||p|| + ||q|| < n - 1 ⇒ ipolynomial-term(add-ipoly(p;q)) ≡ ipolynomial-term(p) (+) ipolynomial-term(q))
4. u : iMonomial()
5. v : iMonomial() List
6. u1 : iMonomial()
7. v1 : iMonomial() List
8. ||[u / v]|| + ||[u1 / v1]|| < n
9. ↑imonomial-le(u;u1)
⊢ ipolynomial-term(if imonomial-le(u1;u)
  then let x ⟵ add-ipoly(v;v1)
       in let cp,vs = u
          in eval c = cp + (fst(u1)) in
             if c=0 then x else [<c, vs> / x]
  else let x ⟵ add-ipoly(v;[u1 / v1])
       in [u / x]
  fi ) ≡ ipolynomial-term([u / v]) (+) ipolynomial-term([u1 / v1])
BY
{ (AutoSplit THEN (CallByValueReduce 0 THENA Auto)) }

1
1. n : ℤ
2. 0 < n
3. ∀p,q:iMonomial() List.
     (||p|| + ||q|| < n - 1 ⇒ ipolynomial-term(add-ipoly(p;q)) ≡ ipolynomial-term(p) (+) ipolynomial-term(q))
4. u : iMonomial()
5. v : iMonomial() List
6. u1 : iMonomial()
7. v1 : iMonomial() List
8. ||[u / v]|| + ||[u1 / v1]|| < n
9. ↑imonomial-le(u;u1)
10. ↑imonomial-le(u1;u)
⊢ ipolynomial-term(let cp,vs = u
                   in eval c = cp + (fst(u1)) in

                      if c=0 then add-ipoly(v;v1) else [<c, vs> / add-ipoly(v;v1)]) ≡ ipolynomial-term([u / v])

(+) ipolynomial-term([u1 / v1])

2
1. n : ℤ
2. 0 < n
3. ∀p,q:iMonomial() List.
(||p|| + ||q|| < n - 1 ⇒ ipolynomial-term(add-ipoly(p;q)) ≡ ipolynomial-term(p) (+) ipolynomial-term(q))
4. u : iMonomial()
5. v : iMonomial() List
6. u1 : iMonomial()
7. ¬↑imonomial-le(u1;u)
8. v1 : iMonomial() List
9. ||[u / v]|| + ||[u1 / v1]|| < n
10. ↑imonomial-le(u;u1)

⊢ ipolynomial-term([u / add-ipoly(v;[u1 / v1])]) ≡ ipolynomial-term([u / v]) (+) ipolynomial-term([u1 / v1])

Latex:

Latex:
1. n : \mBbbZ{} 2. 0 < n 3. \mforall{}p,q:iMonomial() List. (||p|| + ||q|| < n - 1 {}\mRightarrow{} ipolynomial-term(add-ipoly(p;q)) \mequiv{} ipolynomial-term(p) (+) ipolynomial-term(q)) 4. u : iMonomial() 5. v : iMonomial() List 6. u1 : iMonomial() 7. v1 : iMonomial() List 8. ||[u / v]|| + ||[u1 / v1]|| < n 9. \muparrow{}imonomial-le(u;u1) \mvdash{} ipolynomial-term(if imonomial-le(u1;u) then let x \mleftarrow{}{} add-ipoly(v;v1) in let cp,vs = u in eval c = cp + (fst(u1)) in if c=0 then x else [<c, vs> / x] else let x \mleftarrow{}{} add-ipoly(v;[u1 / v1]) in [u / x] fi ) \mequiv{} ipolynomial-term([u / v]) (+) ipolynomial-term([u1 / v1]) By Latex: (AutoSplit THEN (CallByValueReduce 0 THENA Auto)) Home Index