Proof of Nuprl Lemma : flattice-equiv-equiv

Step * 1 1 1 1 of Lemma flattice-equiv-equiv

1. X : Type
2. ((X + X) List List) ⊆r Point(free-dl(X + X))
3. a : Base
4. a1 : Base

5. a = a1 ∈ pertype(λas,bs. ((as ∈ (X + X) List List) ∧ (bs ∈ (X + X) List List) ∧ dlattice-eq(X + X;as;bs)))

6. a ∈ (X + X) List List
7. a1 ∈ (X + X) List List
8. dlattice-eq(X + X;a;a1)
9. a = a ∈ Point(free-dl(X + X))
10. a = a ∈ Point(free-dl(X + X))
11. i : ℕ||a||
⊢ (∃a@0∈a. a@0 ⊆ a[i])
BY
{ (D 0 With ⌜i⌝ THEN Auto) }

Latex:

Latex:
1. X : Type 2. ((X + X) List List) \msubseteq{}r Point(free-dl(X + X)) 3. a : Base 4. a1 : Base 5. a = a1 6. a \mmember{} (X + X) List List 7. a1 \mmember{} (X + X) List List 8. dlattice-eq(X + X;a;a1) 9. a = a 10. a = a 11. i : \mBbbN{}||a|| \mvdash{} (\mexists{}a@0\mmember{}a. a@0 \msubseteq{} a[i]) By Latex: (D 0 With \mkleeneopen{}i\mkleeneclose{} THEN Auto) Home Index