Proof of Nuprl Lemma : FOL-proveable-evidence

Step * 1 7 of Lemma FOL-proveable-evidence

1. hyps : mFOL() List
2. concl : mFOL()
3. subgoals : mFOL-sequent() List
4. subproofs : ℕ||subgoals|| ⟶ proof-tree(mFOL-sequent();FOLRule();λsr.FOLeffect(sr))
5. ∀b:ℕ||subgoals||. ∀s:mFOL-sequent().
(correct_proof(mFOL-sequent();λsr.FOLeffect(sr);s;subproofs b) ⇒ FOL-sequent-evidence{i:l}(s))
6. ∀i:ℕ||subgoals||. correct_proof(mFOL-sequent();λsr.FOLeffect(sr);subgoals[i];subproofs i)
7. (concl ∈ hyps)
8. [] = subgoals ∈ (mFOL-sequent() List)
⊢ FOL-sequent-evidence{i:l}(<hyps, concl>)
BY
{ (ThinVar `subgoals'

   THEN ((RepeatFor 2 (D (-1)) THEN (HypSubst' (-1) 0 THENA Auto)) THEN BLemma `FOL-sequent-evidence-trivial` THEN Auto)

⋅
) }

Latex:

Latex:
1. hyps : mFOL() List 2. concl : mFOL() 3. subgoals : mFOL-sequent() List 4. subproofs : \mBbbN{}||subgoals|| {}\mrightarrow{} proof-tree(mFOL-sequent();FOLRule();\mlambda{}sr.FOLeffect(sr)) 5. \mforall{}b:\mBbbN{}||subgoals||. \mforall{}s:mFOL-sequent(). (correct\_proof(mFOL-sequent();\mlambda{}sr.FOLeffect(sr);s;subproofs b) {}\mRightarrow{} FOL-sequent-evidence\{i:l\}(s)) 6. \mforall{}i:\mBbbN{}||subgoals||. correct\_proof(mFOL-sequent();\mlambda{}sr.FOLeffect(sr);subgoals[i];subproofs i) 7. (concl \mmember{} hyps) 8. [] = subgoals \mvdash{} FOL-sequent-evidence\{i:l\}(<hyps, concl>) By Latex: (ThinVar `subgoals' THEN ((RepeatFor 2 (D (-1)) THEN (HypSubst' (-1) 0 THENA Auto)) THEN BLemma `FOL-sequent-evidence-trivial` THEN Auto)\mcdot{} ) Home Index