Proof of Nuprl Lemma : satisfies-gcd-reduce-eq-constraints

Step * 1 2 1 2 2 2 2 of Lemma satisfies-gcd-reduce-eq-constraints

1. n : ℕ⁺
2. v : ℤ List
3. ||[1 / v]|| = n ∈ ℤ
4. u : ℤ
5. v2 : ℤ List
6. ||[u / v2]|| = n ∈ ℤ
7. v1 : {L:ℤ List| ||L|| = n ∈ ℤ}  List
8. ∀sat:{L:ℤ List| ||L|| = n ∈ ℤ}  List
     ((∀as∈sat.[1 / v] ⋅ as =0)
     ⇒ (∀as∈v1.[1 / v] ⋅ as =0)
     ⇒

 ((↑isl(gcd-reduce-eq-constraints(sat;v1))) ∧ (∀as∈outl(gcd-reduce-eq-constraints(sat;v1)).[1 / v] ⋅ as =0)))

9. sat : {L:ℤ List| ||L|| = n ∈ ℤ} List
10. (∀as∈sat.[1 / v] ⋅ as =0)
11. (∀as∈[[u / v2] / v1].[1 / v] ⋅ as =0)
12. ¬↑null(v2)
13. gg : ℤ
14. |gcd-list(v2)| = gg ∈ ℤ
15. ¬1 < gg
⊢ (↑isl(let s' ⟵ inl [[u / v2] / sat]
in accumulate_abort(L,Ls.let h,t = L

                                 in if t = Ax then if h=0 then inl [L / Ls] else (inr ⋅ )

                                    otherwise eval g = |gcd-list(t)| in
                                              if (1) < (g)
                                                 then if h rem g=0

                                                      then eval L' = eager-map(λx.(x ÷ g);L) in

                                                           inl [L' / Ls]

                                                      else (inr ⋅ )

                                                 else (inl [L / Ls]);s';v1)))

∧ (∀as∈outl(let s' ⟵ inl [[u / v2] / sat]
in accumulate_abort(L,Ls.let h,t = L

                                     in if t = Ax then if h=0 then inl [L / Ls] else (inr ⋅ )

otherwise eval g = |gcd-list(t)| in
if (1) < (g)

                                                     then if h rem g=0

                                                          then eval L' = eager-map(λx.(x ÷ g);L) in

                                                               inl [L' / Ls]

                                                          else (inr ⋅ )

                                                     else (inl [L / Ls]);s';v1)).[1 / v] ⋅ as =0)

BY
{ ((CallByValueReduce 0 THENA Auto)
   THEN Fold `gcd-reduce-eq-constraints` 0
   THEN (RWO "l_all_cons" (-5) THENA Auto)
   THEN InstHyp [⌜[[u / v2] / sat]⌝] 8⋅
   THEN Auto) }

Latex:

Latex:
1. n : \mBbbN{}\msupplus{} 2. v : \mBbbZ{} List 3. ||[1 / v]|| = n 4. u : \mBbbZ{} 5. v2 : \mBbbZ{} List 6. ||[u / v2]|| = n 7. v1 : \{L:\mBbbZ{} List| ||L|| = n\} List 8. \mforall{}sat:\{L:\mBbbZ{} List| ||L|| = n\} List ((\mforall{}as\mmember{}sat.[1 / v] \mcdot{} as =0) {}\mRightarrow{} (\mforall{}as\mmember{}v1.[1 / v] \mcdot{} as =0) {}\mRightarrow{} ((\muparrow{}isl(gcd-reduce-eq-constraints(sat;v1))) \mwedge{} (\mforall{}as\mmember{}outl(gcd-reduce-eq-constraints(sat;v1)).[1 / v] \mcdot{} as =0))) 9. sat : \{L:\mBbbZ{} List| ||L|| = n\} List 10. (\mforall{}as\mmember{}sat.[1 / v] \mcdot{} as =0) 11. (\mforall{}as\mmember{}[[u / v2] / v1].[1 / v] \mcdot{} as =0) 12. \mneg{}\muparrow{}null(v2) 13. gg : \mBbbZ{} 14. |gcd-list(v2)| = gg 15. \mneg{}1 < gg \mvdash{} (\muparrow{}isl(let s' \mleftarrow{}{} inl [[u / v2] / sat] in accumulate\_abort(L,Ls.let h,t = L in if t = Ax then if h=0 then inl [L / Ls] else (inr \mcdot{} ) otherwise eval g = |gcd-list(t)| in if (1) < (g) then if h rem g=0 then eval L' = eager-map(\mlambda{}x.(x \mdiv{} g);L) in inl [L' / Ls] else (inr \mcdot{} ) else (inl [L / Ls]);s';v1))) \mwedge{} (\mforall{}as\mmember{}outl(let s' \mleftarrow{}{} inl [[u / v2] / sat] in accumulate\_abort(L,Ls.let h,t = L in if t = Ax then if h=0 then inl [L / Ls] else (inr \mcdot{} ) otherwise eval g = |gcd-list(t)| in if (1) < (g) then if h rem g=0 then eval L' = eager-map(\mlambda{}x.(x \mdiv{} g);L) in inl [L' / Ls] else (inr \mcdot{} ) else (inl [L / Ls]);s';v1)).[1 / v] \mcdot{} as =0) By Latex: ((CallByValueReduce 0 THENA Auto) THEN Fold `gcd-reduce-eq-constraints` 0 THEN (RWO "l\_all\_cons" (-5) THENA Auto) THEN InstHyp [\mkleeneopen{}[[u / v2] / sat]\mkleeneclose{}] 8\mcdot{} THEN Auto) Home Index