Proof of Nuprl Lemma : lattice-axioms-from-order

Step * 4 of Lemma lattice-axioms-from-order

1. l : LatticeStructure
2. R : Point(l) ⟶ Point(l) ⟶ ℙ
3. ∀[a,b:Point(l)].  least-upper-bound(Point(l);x,y.R[x;y];a;b;a ∨ b)
4. ∀[a,b:Point(l)].  greatest-lower-bound(Point(l);x,y.R[x;y];a;b;a ∧ b)
5. Order(Point(l);x,y.R[x;y])
6. ∀[a,b:Point(l)].  (a ∨ b = b ∨ a ∈ Point(l))
7. ∀[a,b,c:Point(l)].  (a ∧ b ∧ c = a ∧ b ∧ c ∈ Point(l))
8. a : Point(l)
9. b : Point(l)
10. c : Point(l)
⊢ a ∨ b ∨ c = a ∨ b ∨ c ∈ Point(l)
BY
{ (InstLemma `lub-assoc` [⌜Point(l)⌝;⌜R⌝;⌜λ₂a b.a ∨ b⌝]⋅ THEN Auto) }

Latex:

Latex:
1. l : LatticeStructure 2. R : Point(l) {}\mrightarrow{} Point(l) {}\mrightarrow{} \mBbbP{} 3. \mforall{}[a,b:Point(l)]. least-upper-bound(Point(l);x,y.R[x;y];a;b;a \mvee{} b) 4. \mforall{}[a,b:Point(l)]. greatest-lower-bound(Point(l);x,y.R[x;y];a;b;a \mwedge{} b) 5. Order(Point(l);x,y.R[x;y]) 6. \mforall{}[a,b:Point(l)]. (a \mvee{} b = b \mvee{} a) 7. \mforall{}[a,b,c:Point(l)]. (a \mwedge{} b \mwedge{} c = a \mwedge{} b \mwedge{} c) 8. a : Point(l) 9. b : Point(l) 10. c : Point(l) \mvdash{} a \mvee{} b \mvee{} c = a \mvee{} b \mvee{} c By Latex: (InstLemma `lub-assoc` [\mkleeneopen{}Point(l)\mkleeneclose{};\mkleeneopen{}R\mkleeneclose{};\mkleeneopen{}\mlambda{}\msubtwo{}a b.a \mvee{} b\mkleeneclose{}]\mcdot{} THEN Auto) Home Index