Proof of Nuprl Lemma : mFOL-subst-abstract

Step * 2 1 of Lemma mFOL-subst-abstract

.....subterm..... T:t
3:n
1. Dom : Type
2. S : FOStruct(Dom)
3. fmla : mFOL()
4. x : ℤ
5. y : ℤ
6. v : mFOL()
7. mFOL-freevars(v) = mFOL-freevars(fmla) ∈ (ℤ List)
8. mFOL-abstract(v) = mFOL-abstract(fmla) ∈ AbstractFOFormula(mFOL-freevars(fmla))
9. ¬(x ∈ mFOL-boundvars(v))
10. a : FOAssignment(mFOL-freevars(mFOL-rename(v;y;x)),Dom)

11. a[y := a x] = if y ∈_b mFOL-freevars(v) then a[y := a x] else a fi  ∈ FOAssignment(mFOL-freevars(v),Dom)

12. Dom,S,a[y := a x] |= mFOL-abstract(v) = Dom,S,a |= mFOL-abstract(mFOL-rename(v;y;x)) ∈ ℙ
⊢ a[y := a x] = a[y := a x] ∈ FOAssignment(mFOL-freevars(fmla),Dom)
BY
{ (RevHypSubst' 7 0 THEN Auto) }

Latex:

Latex:
.....subterm..... T:t 3:n 1. Dom : Type 2. S : FOStruct(Dom) 3. fmla : mFOL() 4. x : \mBbbZ{} 5. y : \mBbbZ{} 6. v : mFOL() 7. mFOL-freevars(v) = mFOL-freevars(fmla) 8. mFOL-abstract(v) = mFOL-abstract(fmla) 9. \mneg{}(x \mmember{} mFOL-boundvars(v)) 10. a : FOAssignment(mFOL-freevars(mFOL-rename(v;y;x)),Dom) 11. a[y := a x] = if y \mmember{}\msubb{} mFOL-freevars(v) then a[y := a x] else a fi 12. Dom,S,a[y := a x] |= mFOL-abstract(v) = Dom,S,a |= mFOL-abstract(mFOL-rename(v;y;x)) \mvdash{} a[y := a x] = a[y := a x] By Latex: (RevHypSubst' 7 0 THEN Auto) Home Index