Proof of Nuprl Lemma : lattice-hom-fset-meet

Step * 1 1 1 1 2 of Lemma lattice-hom-fset-meet

1. l1 : BoundedLattice
2. l2 : BoundedLattice
3. eq1 : EqDecider(Point(l1))
4. eq2 : EqDecider(Point(l2))
5. f : Hom(l1;l2)
6. u : Point(l1)
7. v : Point(l1) List
8. (f /\(v)) = /\(f"(v)) ∈ Point(l2)
⊢ (f /\([u / v])) = /\(f"([u / v])) ∈ Point(l2)
BY
{ (RepUR ``lattice-fset-meet`` 0 THEN Fold `lattice-fset-meet` 0) }

1
1. l1 : BoundedLattice
2. l2 : BoundedLattice
3. eq1 : EqDecider(Point(l1))
4. eq2 : EqDecider(Point(l2))
5. f : Hom(l1;l2)
6. u : Point(l1)
7. v : Point(l1) List
8. (f /\(v)) = /\(f"(v)) ∈ Point(l2)
⊢ (f u ∧ /\(v)) = /\(f"([u / v])) ∈ Point(l2)

Latex:

Latex:
1. l1 : BoundedLattice 2. l2 : BoundedLattice 3. eq1 : EqDecider(Point(l1)) 4. eq2 : EqDecider(Point(l2)) 5. f : Hom(l1;l2) 6. u : Point(l1) 7. v : Point(l1) List 8. (f /\mbackslash{}(v)) = /\mbackslash{}(f"(v)) \mvdash{} (f /\mbackslash{}([u / v])) = /\mbackslash{}(f"([u / v])) By Latex: (RepUR ``lattice-fset-meet`` 0 THEN Fold `lattice-fset-meet` 0) Home Index