Proof of Nuprl Lemma : lattice-meet-join-images-distrib

Step * 1 1 1 of Lemma lattice-meet-join-images-distrib

1. L : BoundedDistributiveLattice@i'
2. eqL : EqDecider(Point(L))@i
3. as : fset(fset(Point(L)))@i
4. bs : fset(fset(Point(L)))@i
5. ∀[s1,s2:fset(Point(L))]. (\/(s1) ∧ \/(s2) = \/(f-union(eqL;eqL;s1;a.λb.a ∧ b"(s2))) ∈ Point(L))
6. a : Point(L)
7. a1 : Point(L)
8. x : fset(Point(L))
9. x ∈ as
10. a1 = /\(x) ∈ Point(L)
11. x1 : Point(L)
12. x2 : fset(Point(L))
13. x2 ∈ bs
14. x1 = /\(x2) ∈ Point(L)
15. a = a1 ∧ x1 ∈ Point(L)
⊢ a ∈ λls./\(ls)"(f-union(deq-fset(eqL);deq-fset(eqL);as;as.λbs.as ⋃ bs"(bs)))
BY
{ ((HypSubst' (-2) (-1) THENA Auto) THEN (HypSubst' (-6) (-1) THENA Auto)) }

1
1. L : BoundedDistributiveLattice@i'
2. eqL : EqDecider(Point(L))@i
3. as : fset(fset(Point(L)))@i
4. bs : fset(fset(Point(L)))@i
5. ∀[s1,s2:fset(Point(L))]. (\/(s1) ∧ \/(s2) = \/(f-union(eqL;eqL;s1;a.λb.a ∧ b"(s2))) ∈ Point(L))
6. a : Point(L)
7. a1 : Point(L)
8. x : fset(Point(L))
9. x ∈ as
10. a1 = /\(x) ∈ Point(L)
11. x1 : Point(L)
12. x2 : fset(Point(L))
13. x2 ∈ bs
14. x1 = /\(x2) ∈ Point(L)
15. a = /\(x) ∧ /\(x2) ∈ Point(L)
⊢ a ∈ λls./\(ls)"(f-union(deq-fset(eqL);deq-fset(eqL);as;as.λbs.as ⋃ bs"(bs)))

Latex:

Latex:
1. L : BoundedDistributiveLattice@i' 2. eqL : EqDecider(Point(L))@i 3. as : fset(fset(Point(L)))@i 4. bs : fset(fset(Point(L)))@i 5. \mforall{}[s1,s2:fset(Point(L))]. (\mbackslash{}/(s1) \mwedge{} \mbackslash{}/(s2) = \mbackslash{}/(f-union(eqL;eqL;s1;a.\mlambda{}b.a \mwedge{} b"(s2)))) 6. a : Point(L) 7. a1 : Point(L) 8. x : fset(Point(L)) 9. x \mmember{} as 10. a1 = /\mbackslash{}(x) 11. x1 : Point(L) 12. x2 : fset(Point(L)) 13. x2 \mmember{} bs 14. x1 = /\mbackslash{}(x2) 15. a = a1 \mwedge{} x1 \mvdash{} a \mmember{} \mlambda{}ls./\mbackslash{}(ls)"(f-union(deq-fset(eqL);deq-fset(eqL);as;as.\mlambda{}bs.as \mcup{} bs"(bs))) By Latex: ((HypSubst' (-2) (-1) THENA Auto) THEN (HypSubst' (-6) (-1) THENA Auto)) Home Index