Proof of Nuprl Lemma : add-ipoly-ringeq

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

.....equality.....
1. r : Rng
2. n : ℤ
3. 0 < n
4. ∀p,q:iMonomial() List.
(||p|| + ||q|| < n - 1 ⇒ ipolynomial-term(add-ipoly(p;q)) ≡ ipolynomial-term(p) (+) ipolynomial-term(q))

5. ∀[m:iMonomial()]. ∀[p:iMonomial() List].  ipolynomial-term([m / p]) ≡ imonomial-term(m) (+) ipolynomial-term(p)

6. u2 : ℤ^-^o
7. u3 : {vs:ℤ List| sorted(vs)}
8. v : iMonomial() List
9. u4 : ℤ^-^o
10. u2 + u4 ≠ 0
11. u5 : {vs:ℤ List| sorted(vs)}
12. v1 : iMonomial() List
13. ||[<u2, u3> / v]|| + ||[<u4, u5> / v1]|| < n
14. ↑imonomial-le(<u2, u3>;<u4, u5>)
15. add-ipoly(v;v1) ∈ iMonomial() List
16. add-ipoly(v;[<u4, u5> / v1]) ∈ iMonomial() List
17. ↑imonomial-le(<u4, u5>;<u2, u3>)
18. f : ℤ ⟶ |r|
⊢ u3 ~ u5
BY
{ (∀h:hyp. (RepUR ``imonomial-le`` h THEN (RWO "eqtt_to_assert<" h THENA Auto))
THEN FLemma `intlex-antisym` [14;17]
THEN Auto) }

Latex:

Latex:
.....equality..... 1. r : Rng 2. n : \mBbbZ{} 3. 0 < n 4. \mforall{}p,q:iMonomial() List. (||p|| + ||q|| < n - 1 {}\mRightarrow{} ipolynomial-term(add-ipoly(p;q)) \mequiv{} ipolynomial-term(p) (+) ipolynomial-term(q)) 5. \mforall{}[m:iMonomial()]. \mforall{}[p:iMonomial() List]. ipolynomial-term([m / p]) \mequiv{} imonomial-term(m) (+) ipolynomial-term(p) 6. u2 : \mBbbZ{}\msupminus{}\msupzero{} 7. u3 : \{vs:\mBbbZ{} List| sorted(vs)\} 8. v : iMonomial() List 9. u4 : \mBbbZ{}\msupminus{}\msupzero{} 10. u2 + u4 \mneq{} 0 11. u5 : \{vs:\mBbbZ{} List| sorted(vs)\} 12. v1 : iMonomial() List 13. ||[<u2, u3> / v]|| + ||[<u4, u5> / v1]|| < n 14. \muparrow{}imonomial-le(<u2, u3><u4, u5>) 15. add-ipoly(v;v1) \mmember{} iMonomial() List 16. add-ipoly(v;[<u4, u5> / v1]) \mmember{} iMonomial() List 17. \muparrow{}imonomial-le(<u4, u5><u2, u3>) 18. f : \mBbbZ{} {}\mrightarrow{} |r| \mvdash{} u3 \msim{} u5 By Latex: (\mforall{}h:hyp. (RepUR ``imonomial-le`` h THEN (RWO "eqtt\_to\_assert<" h THENA Auto)) THEN FLemma `intlex-antisym` [14;17] THEN Auto) Home Index