Proof of Nuprl Lemma : mk-DeMorgan-algebra

Step * 1 of Lemma mk-DeMorgan-algebra_wf

.....assertion.....
1. L : BoundedDistributiveLattice
2. n : Point(L) ⟶ Point(L)
3. ∀x:Point(L). ((n (n x)) = x ∈ Point(L))

4. (∀x,y:Point(L).  ((n x ∧ y) = n x ∨ n y ∈ Point(L))) ∨ (∀x,y:Point(L).  ((n x ∨ y) = n x ∧ n y ∈ Point(L)))

⊢ L["neg" := n] ∈ BoundedLatticeStructure
BY
{ (D 1 THEN All Thin) }

1
1. L : BoundedLatticeStructure
2. n : Point(L) ⟶ Point(L)
⊢ L["neg" := n] ∈ BoundedLatticeStructure

Latex:

Latex:
.....assertion..... 1. L : BoundedDistributiveLattice 2. n : Point(L) {}\mrightarrow{} Point(L) 3. \mforall{}x:Point(L). ((n (n x)) = x) 4. (\mforall{}x,y:Point(L). ((n x \mwedge{} y) = n x \mvee{} n y)) \mvee{} (\mforall{}x,y:Point(L). ((n x \mvee{} y) = n x \mwedge{} n y)) \mvdash{} L["neg" := n] \mmember{} BoundedLatticeStructure By Latex: (D 1 THEN All Thin) Home Index