Proof of Nuprl Lemma : FOL-bound-rename

Step * 2 1 1 of Lemma FOL-bound-rename

1. knd : Atom
2. left : mFOL()
3. right : mFOL()
4. ∀L:ℤ List
(∃fmla':mFOL() [((mFOL-freevars(fmla') = mFOL-freevars(left) ∈ (ℤ List))

                    ∧ (FOL-abstract(fmla') = FOL-abstract(left) ∈ AbstractFOFormula+(mFOL-freevars(left)))

∧ l_disjoint(ℤ;L;mFOL-boundvars(fmla')))])
5. ∀L:ℤ List
(∃fmla':mFOL() [((mFOL-freevars(fmla') = mFOL-freevars(right) ∈ (ℤ List))

                    ∧ (FOL-abstract(fmla') = FOL-abstract(right) ∈ AbstractFOFormula+(mFOL-freevars(right)))

∧ l_disjoint(ℤ;L;mFOL-boundvars(fmla')))])
6. L : ℤ List
7. l : mFOL()
8. mFOL-freevars(l) = mFOL-freevars(left) ∈ (ℤ List)
9. FOL-abstract(l) = FOL-abstract(left) ∈ AbstractFOFormula+(mFOL-freevars(left))
10. l_disjoint(ℤ;L;mFOL-boundvars(l))
11. r : mFOL()
12. mFOL-freevars(r) = mFOL-freevars(right) ∈ (ℤ List)
13. FOL-abstract(r) = FOL-abstract(right) ∈ AbstractFOFormula+(mFOL-freevars(right))
14. l_disjoint(ℤ;L;mFOL-boundvars(r))
15. mFOL-freevars(mFOconnect(knd;l;r)) = mFOL-freevars(mFOconnect(knd;left;right)) ∈ (ℤ List)
⊢ (FOConnective+(knd) FOL-abstract(l) FOL-abstract(r))
= (FOConnective+(knd) FOL-abstract(left) FOL-abstract(right))
∈ AbstractFOFormula+(val-union(IntDeq;mFOL-freevars(left);mFOL-freevars(right)))
BY

{ ((InstLemma `FOConnective+_wf` [⌜mFOL-freevars(l)⌝;⌜mFOL-freevars(r)⌝;⌜knd⌝]⋅ THENA Auto) THEN EqCD THEN Auto) }

Latex:

Latex:
1. knd : Atom 2. left : mFOL() 3. right : mFOL() 4. \mforall{}L:\mBbbZ{} List (\mexists{}fmla':mFOL() [((mFOL-freevars(fmla') = mFOL-freevars(left)) \mwedge{} (FOL-abstract(fmla') = FOL-abstract(left)) \mwedge{} l\_disjoint(\mBbbZ{};L;mFOL-boundvars(fmla')))]) 5. \mforall{}L:\mBbbZ{} List (\mexists{}fmla':mFOL() [((mFOL-freevars(fmla') = mFOL-freevars(right)) \mwedge{} (FOL-abstract(fmla') = FOL-abstract(right)) \mwedge{} l\_disjoint(\mBbbZ{};L;mFOL-boundvars(fmla')))]) 6. L : \mBbbZ{} List 7. l : mFOL() 8. mFOL-freevars(l) = mFOL-freevars(left) 9. FOL-abstract(l) = FOL-abstract(left) 10. l\_disjoint(\mBbbZ{};L;mFOL-boundvars(l)) 11. r : mFOL() 12. mFOL-freevars(r) = mFOL-freevars(right) 13. FOL-abstract(r) = FOL-abstract(right) 14. l\_disjoint(\mBbbZ{};L;mFOL-boundvars(r)) 15. mFOL-freevars(mFOconnect(knd;l;r)) = mFOL-freevars(mFOconnect(knd;left;right)) \mvdash{} (FOConnective+(knd) FOL-abstract(l) FOL-abstract(r)) = (FOConnective+(knd) FOL-abstract(left) FOL-abstract(right)) By Latex: ((InstLemma `FOConnective+\_wf` [\mkleeneopen{}mFOL-freevars(l)\mkleeneclose{};\mkleeneopen{}mFOL-freevars(r)\mkleeneclose{};\mkleeneopen{}knd\mkleeneclose{}]\mcdot{} THENA Auto) THEN EqCD THEN Auto) Home Index