Proof of Nuprl Lemma : unsat-omega

Step * 1 1 2 of Lemma unsat-omega_start

1. n : ℕ
2. u : {L:ℤ List| ||L|| = (n + 1) ∈ ℤ}
3. v : {L:ℤ List| ||L|| = (n + 1) ∈ ℤ}  List
4. ineqs : {L:ℤ List| ||L|| = (n + 1) ∈ ℤ}  List
5. xs : ℤ List
6. (∀as∈[u / v].xs ⋅ as =0)
7. (∀bs∈ineqs.xs ⋅ bs ≥0)
⊢ xs |= case gcd-reduce-eq-constraints([];[u / v])
of inl(eqs') =>
case gcd-reduce-ineq-constraints([];ineqs) of inl(ineqs') => inl <eqs', ineqs'> | inr(x) => inr x
| inr(x) =>
inr x
BY
{ (Assert xs ⋅ u =0 BY
         (RWO "l_all_cons" (-2) THEN Auto)) }

1
1. n : ℕ
2. u : {L:ℤ List| ||L|| = (n + 1) ∈ ℤ}
3. v : {L:ℤ List| ||L|| = (n + 1) ∈ ℤ}  List
4. ineqs : {L:ℤ List| ||L|| = (n + 1) ∈ ℤ}  List
5. xs : ℤ List
6. (∀as∈[u / v].xs ⋅ as =0)
7. (∀bs∈ineqs.xs ⋅ bs ≥0)
8. xs ⋅ u =0
⊢ xs |= case gcd-reduce-eq-constraints([];[u / v])
of inl(eqs') =>
case gcd-reduce-ineq-constraints([];ineqs) of inl(ineqs') => inl <eqs', ineqs'> | inr(x) => inr x
| inr(x) =>
inr x

Latex:

Latex:
1. n : \mBbbN{} 2. u : \{L:\mBbbZ{} List| ||L|| = (n + 1)\} 3. v : \{L:\mBbbZ{} List| ||L|| = (n + 1)\} List 4. ineqs : \{L:\mBbbZ{} List| ||L|| = (n + 1)\} List 5. xs : \mBbbZ{} List 6. (\mforall{}as\mmember{}[u / v].xs \mcdot{} as =0) 7. (\mforall{}bs\mmember{}ineqs.xs \mcdot{} bs \mgeq{}0) \mvdash{} xs |= case gcd-reduce-eq-constraints([];[u / v]) of inl(eqs') => case gcd-reduce-ineq-constraints([];ineqs) of inl(ineqs') => inl <eqs', ineqs'> | inr(x) => inr x | inr(x) => inr x By Latex: (Assert xs \mcdot{} u =0 BY (RWO "l\_all\_cons" (-2) THEN Auto)) Home Index