Proof of Nuprl Lemma : dm-neg-neg

Step * 1 1 of Lemma dm-neg-neg

.....wf.....
1. T : Type
2. eq : EqDecider(T)
3. x : Point(free-DeMorgan-lattice(T;eq))
4. ∀g,h:Hom(free-dist-lattice(T + T; union-deq(T;T;eq;eq));free-dist-lattice(T + T; union-deq(T;T;eq;eq))).
     (((λz.free-dl-inc(z))
      = (g o (λx.free-dl-inc(x)))
      ∈ ((T + T) ⟶ Point(free-dist-lattice(T + T; union-deq(T;T;eq;eq)))))
     ⇒ ((λz.free-dl-inc(z))
        = (h o (λx.free-dl-inc(x)))
        ∈ ((T + T) ⟶ Point(free-dist-lattice(T + T; union-deq(T;T;eq;eq)))))
     ⇒

 (g = h ∈ Hom(free-dist-lattice(T + T; union-deq(T;T;eq;eq));free-dist-lattice(T + T; union-deq(T;T;eq;eq)))))

⊢ λx.x ∈ Hom(free-dist-lattice(T + T; union-deq(T;T;eq;eq));free-dist-lattice(T + T; union-deq(T;T;eq;eq)))

BY
{ RepeatFor 2 ((MemTypeCD THEN Reduce 0 THEN Auto)) }

Latex:

Latex:
.....wf..... 1. T : Type 2. eq : EqDecider(T) 3. x : Point(free-DeMorgan-lattice(T;eq)) 4. \mforall{}g,h:Hom(free-dist-lattice(T + T; union-deq(T;T;eq;eq));free-dist-lattice(T + T; union-deq(T;T;eq;eq))). (((\mlambda{}z.free-dl-inc(z)) = (g o (\mlambda{}x.free-dl-inc(x)))) {}\mRightarrow{} ((\mlambda{}z.free-dl-inc(z)) = (h o (\mlambda{}x.free-dl-inc(x)))) {}\mRightarrow{} (g = h)) \mvdash{} \mlambda{}x.x \mmember{} Hom(free-dist-lattice(T + T; union-deq(T;T;eq;eq));free-dist-lattice(T + T; union-deq(T;T;eq;eq))) By Latex: RepeatFor 2 ((MemTypeCD THEN Reduce 0 THEN Auto)) Home Index