Proof of Nuprl Lemma : lattice-fset-meet

Step * 2 1 2 of Lemma lattice-fset-meet_wf

1. l : BoundedLattice
2. eq : EqDecider(Point(l))
3. n : ℤ
4. 0 < n
5. ∀L1:Point(l) List
     (||L1|| < n - 1 ⇒ (∀L2:Point(l) List. (set-equal(Point(l);L1;L2) ⇒ (/\(L1) = /\(L2) ∈ Point(l)))))
6. u : Point(l)
7. v : Point(l) List
8. ||[u / v]|| < n
9. L2 : Point(l) List
10. set-equal(Point(l);[u / v];L2)
⊢ /\([u / v]) = /\(L2) ∈ Point(l)
BY
{ ((InstLemma `set-equal-cons2` [Point(l);eq;u;⌜v⌝;⌜L2⌝]⋅ THENA Auto)
   THEN D -1
   THEN Thin (-1)
   THEN RepeatFor 2 ((D -1 THENA Auto))
   THEN (FHyp 5 [-1] THENA Auto)) }

1
1. l : BoundedLattice
2. eq : EqDecider(Point(l))
3. n : ℤ
4. 0 < n
5. ∀L1:Point(l) List
     (||L1|| < n - 1 ⇒ (∀L2:Point(l) List. (set-equal(Point(l);L1;L2) ⇒ (/\(L1) = /\(L2) ∈ Point(l)))))
6. u : Point(l)
7. v : Point(l) List
8. ||[u / v]|| < n
9. L2 : Point(l) List
10. set-equal(Point(l);[u / v];L2)
11. (u ∈ L2)
12. set-equal(Point(l);filter(λx.(¬_b(eq x u));v);filter(λx.(¬_b(eq x u));L2))
13. /\(filter(λx.(¬_b(eq x u));v)) = /\(filter(λx.(¬_b(eq x u));L2)) ∈ Point(l)
⊢ /\([u / v]) = /\(L2) ∈ Point(l)

Latex:

Latex:
1. l : BoundedLattice 2. eq : EqDecider(Point(l)) 3. n : \mBbbZ{} 4. 0 < n 5. \mforall{}L1:Point(l) List (||L1|| < n - 1 {}\mRightarrow{} (\mforall{}L2:Point(l) List. (set-equal(Point(l);L1;L2) {}\mRightarrow{} (/\mbackslash{}(L1) = /\mbackslash{}(L2))))) 6. u : Point(l) 7. v : Point(l) List 8. ||[u / v]|| < n 9. L2 : Point(l) List 10. set-equal(Point(l);[u / v];L2) \mvdash{} /\mbackslash{}([u / v]) = /\mbackslash{}(L2) By Latex: ((InstLemma `set-equal-cons2` [Point(l);eq;u;\mkleeneopen{}v\mkleeneclose{};\mkleeneopen{}L2\mkleeneclose{}]\mcdot{} THENA Auto) THEN D -1 THEN Thin (-1) THEN RepeatFor 2 ((D -1 THENA Auto)) THEN (FHyp 5 [-1] THENA Auto)) Home Index