Proof of Nuprl Lemma : dm-neg-properties

Step * 2 of Lemma dm-neg-properties

1. T : Type
2. eq : EqDecider(T)

3. (λx.¬(x)) = (λx.¬(x)) ∈ (Point(free-DeMorgan-lattice(T;eq)) ⟶ Point(opposite-lattice(free-DeMorgan-lattice(T;eq))))

4. ∀[a,b:Point(free-DeMorgan-lattice(T;eq))].
((¬(a) ∧ ¬(b) = ¬(a ∧ b) ∈ Point(opposite-lattice(free-DeMorgan-lattice(T;eq))))
∧ (¬(a) ∨ ¬(b) = ¬(a ∨ b) ∈ Point(opposite-lattice(free-DeMorgan-lattice(T;eq)))))
5. ¬(0) = 0 ∈ Point(free-DeMorgan-lattice(T;eq))
6. ¬(1) = 1 ∈ Point(free-DeMorgan-lattice(T;eq))
7. Point(free-DeMorgan-lattice(T;eq)) ~ Point(opposite-lattice(free-DeMorgan-lattice(T;eq)))

8. ∀[x,y:Point(free-DeMorgan-lattice(T;eq))].  (¬(x ∧ y) = ¬(x) ∨ ¬(y) ∈ Point(free-DeMorgan-lattice(T;eq)))

9. x : Point(free-DeMorgan-lattice(T;eq))
10. y : Point(free-DeMorgan-lattice(T;eq))
11. ¬(x) ∧ ¬(y) = ¬(x ∧ y) ∈ Point(opposite-lattice(free-DeMorgan-lattice(T;eq)))
12. ¬(x) ∨ ¬(y) = ¬(x ∨ y) ∈ Point(opposite-lattice(free-DeMorgan-lattice(T;eq)))
⊢ ¬(x ∨ y) = ¬(x) ∧ ¬(y) ∈ Point(free-DeMorgan-lattice(T;eq))
BY
{ (Symmetry THEN NthHypEq (-1) THEN EqCD THEN Auto) }

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. (\mlambda{}x.\mneg{}(x)) = (\mlambda{}x.\mneg{}(x)) 4. \mforall{}[a,b:Point(free-DeMorgan-lattice(T;eq))]. ((\mneg{}(a) \mwedge{} \mneg{}(b) = \mneg{}(a \mwedge{} b)) \mwedge{} (\mneg{}(a) \mvee{} \mneg{}(b) = \mneg{}(a \mvee{} b))) 5. \mneg{}(0) = 0 6. \mneg{}(1) = 1 7. Point(free-DeMorgan-lattice(T;eq)) \msim{} Point(opposite-lattice(free-DeMorgan-lattice(T;eq))) 8. \mforall{}[x,y:Point(free-DeMorgan-lattice(T;eq))]. (\mneg{}(x \mwedge{} y) = \mneg{}(x) \mvee{} \mneg{}(y)) 9. x : Point(free-DeMorgan-lattice(T;eq)) 10. y : Point(free-DeMorgan-lattice(T;eq)) 11. \mneg{}(x) \mwedge{} \mneg{}(y) = \mneg{}(x \mwedge{} y) 12. \mneg{}(x) \mvee{} \mneg{}(y) = \mneg{}(x \mvee{} y) \mvdash{} \mneg{}(x \mvee{} y) = \mneg{}(x) \mwedge{} \mneg{}(y) By Latex: (Symmetry THEN NthHypEq (-1) THEN EqCD THEN Auto) Home Index