Proof of Nuprl Lemma : rP_to_poly-int_term_to

Step * 2 1 of Lemma rP_to_poly-int_term_to_rP

1. int_term() ⊆r Base
2. (iPolynomial() List) ⊆r Base
⊢ ∀t:int_term(). ∀s:iPolynomial() List.  (rP_to_poly(s;int_term_to_rP(t)) ~ [int_term_to_ipoly(t) / s])
BY
{ Assert ⌜∀t:int_term(). ∀s:iPolynomial() List. ∀L:ℤ List.
            (rP_to_poly(s;int_term_to_rP(t) @ L) ~ rP_to_poly([int_term_to_ipoly(t) / s];L))⌝⋅ }

1
.....assertion.....
1. int_term() ⊆r Base
2. (iPolynomial() List) ⊆r Base
⊢ ∀t:int_term(). ∀s:iPolynomial() List. ∀L:ℤ List.
    (rP_to_poly(s;int_term_to_rP(t) @ L) ~ rP_to_poly([int_term_to_ipoly(t) / s];L))

2
1. int_term() ⊆r Base
2. (iPolynomial() List) ⊆r Base
3. ∀t:int_term(). ∀s:iPolynomial() List. ∀L:ℤ List.
     (rP_to_poly(s;int_term_to_rP(t) @ L) ~ rP_to_poly([int_term_to_ipoly(t) / s];L))
⊢ ∀t:int_term(). ∀s:iPolynomial() List.  (rP_to_poly(s;int_term_to_rP(t)) ~ [int_term_to_ipoly(t) / s])

Latex:

Latex:
1. int\_term() \msubseteq{}r Base 2. (iPolynomial() List) \msubseteq{}r Base \mvdash{} \mforall{}t:int\_term(). \mforall{}s:iPolynomial() List. (rP\_to\_poly(s;int\_term\_to\_rP(t)) \msim{} [int\_term\_to\_ipoly(t) / s]) By Latex: Assert \mkleeneopen{}\mforall{}t:int\_term(). \mforall{}s:iPolynomial() List. \mforall{}L:\mBbbZ{} List. (rP\_to\_poly(s;int\_term\_to\_rP(t) @ L) \msim{} rP\_to\_poly([int\_term\_to\_ipoly(t) / s];L))\mkleeneclose{}\mcdot{} Home Index