Proof of Nuprl Lemma : mFOL-proveable-evidence

Step * 1 12 1 1 1 1 of Lemma mFOL-proveable-evidence

.....assertion.....
1. hyps : mFOL() List@i
2. concl : mFOL()@i
3. subgoals : mFOL-sequent() List@i
4. hypnum : ℕ@i
5. z : ℤ@i
6. ¬(z ∈ mFOL-freevars(concl))
7. hypnum < ||hyps||
8. (∀h∈hyps.¬(z ∈ mFOL-freevars(h)))
9. ↑mFOquant?(hyps[hypnum])
10. mFOquant-isall(hyps[hypnum]) = ff
11. [Dom] : Type
12. [S] : FOStruct(Dom)
13. a : FOAssignment(Dom)@i
14. tuple-type(map(λh.Dom,S,a |= mFOL-abstract(h);hyps))@i
15. B : mFOL()@i
16. mFOquant-body(hyps[hypnum]) = B ∈ mFOL()@i
17. y : ℤ@i
18. mFOquant-var(hyps[hypnum]) = y ∈ ℤ@i
19. mFOL-sequent-evidence(<[B[z/y] / hyps], concl>)@i'
20. hyps[hypnum] = ∃y;B) ∈ mFOL()@i
⊢ Dom,S,a |= mFOL-abstract(∃y;B))
BY
{ (RevHypSubst (-1) 0 THEN Auto) }

1
1. hyps : mFOL() List@i
2. concl : mFOL()@i
3. subgoals : mFOL-sequent() List@i
4. hypnum : ℕ@i
5. z : ℤ@i
6. ¬(z ∈ mFOL-freevars(concl))
7. hypnum < ||hyps||
8. (∀h∈hyps.¬(z ∈ mFOL-freevars(h)))
9. ↑mFOquant?(hyps[hypnum])
10. mFOquant-isall(hyps[hypnum]) = ff
11. [Dom] : Type
12. [S] : FOStruct(Dom)
13. a : FOAssignment(Dom)@i
14. tuple-type(map(λh.Dom,S,a |= mFOL-abstract(h);hyps))@i
15. B : mFOL()@i
16. mFOquant-body(hyps[hypnum]) = B ∈ mFOL()@i
17. y : ℤ@i
18. mFOquant-var(hyps[hypnum]) = y ∈ ℤ@i
19. mFOL-sequent-evidence(<[B[z/y] / hyps], concl>)@i'
20. hyps[hypnum] = ∃y;B) ∈ mFOL()@i
⊢ Dom,S,a |= mFOL-abstract(hyps[hypnum])

Latex:

.....assertion..... 1. hyps : mFOL() List@i 2. concl : mFOL()@i 3. subgoals : mFOL-sequent() List@i 4. hypnum : \mBbbN{}@i 5. z : \mBbbZ{}@i 6. \mneg{}(z \mmember{} mFOL-freevars(concl)) 7. hypnum < ||hyps|| 8. (\mforall{}h\mmember{}hyps.\mneg{}(z \mmember{} mFOL-freevars(h))) 9. \muparrow{}mFOquant?(hyps[hypnum]) 10. mFOquant-isall(hyps[hypnum]) = ff 11. [Dom] : Type 12. [S] : FOStruct(Dom) 13. a : FOAssignment(Dom)@i 14. tuple-type(map(\mlambda{}h.Dom,S,a |= mFOL-abstract(h);hyps))@i 15. B : mFOL()@i 16. mFOquant-body(hyps[hypnum]) = B@i 17. y : \mBbbZ{}@i 18. mFOquant-var(hyps[hypnum]) = y@i 19. mFOL-sequent-evidence(<[B[z/y] / hyps], concl>)@i' 20. hyps[hypnum] = \mexists{}y;B)@i \mvdash{} Dom,S,a |= mFOL-abstract(\mexists{}y;B)) By (RevHypSubst (-1) 0 THEN Auto) Home Index