Proof of Nuprl Lemma : cs-possible-state-reachable

Step * of Lemma cs-possible-state-reachable

∀[V:Type]. ∀[A:Id List]. ∀[W:{a:Id| (a ∈ A)}  List List]. ∀[v:V].
  (∀[L:{a:Id| (a ∈ A)}  List]
     (<λa.<0, if a ∈_b L then 0 : v else ⊗ fi >, λa.mk_fpf(A;λb.<0, ff>)>
      ∈ ts-reachable(consensus-ts5(V;A;W)))) supposing
     (two-intersection(A;W) and
     1 < ||W||)
BY
{ (Intros THEN Unhide THEN Unfold `ts-reachable` 0 THEN MemTypeCD) }

1
1. V : Type
2. A : Id List
3. W : {a:Id| (a ∈ A)}  List List
4. v : V
5. 1 < ||W||
6. two-intersection(A;W)
7. L : {a:Id| (a ∈ A)}  List

⊢ <λa.<0, if a ∈_b L then 0 : v else ⊗ fi >, λa.mk_fpf(A;λb.<0, ff>)> ∈ ts-type(consensus-ts5(V;A;W))

2
.....set predicate.....
1. V : Type
2. A : Id List
3. W : {a:Id| (a ∈ A)}  List List
4. v : V
5. 1 < ||W||
6. two-intersection(A;W)
7. L : {a:Id| (a ∈ A)}  List
⊢ ts-init(consensus-ts5(V;A;W))
  (ts-rel(consensus-ts5(V;A;W))^*)
  <λa.<0, if a ∈_b L then 0 : v else ⊗ fi >, λa.mk_fpf(A;λb.<0, ff>)>

3
.....wf.....
1. V : Type
2. A : Id List
3. W : {a:Id| (a ∈ A)}  List List
4. v : V
5. 1 < ||W||
6. two-intersection(A;W)
7. L : {a:Id| (a ∈ A)}  List
8. s : ts-type(consensus-ts5(V;A;W))
⊢ ts-init(consensus-ts5(V;A;W)) (ts-rel(consensus-ts5(V;A;W))^*) s ∈ Type

Latex:

Latex:
\mforall{}[V:Type]. \mforall{}[A:Id List]. \mforall{}[W:\{a:Id| (a \mmember{} A)\} List List]. \mforall{}[v:V]. (\mforall{}[L:\{a:Id| (a \mmember{} A)\} List] (<\mlambda{}a.ɘ, if a \mmember{}\msubb{} L then 0 : v else \motimes{} fi >, \mlambda{}a.mk\_fpf(A;\mlambda{}b.ɘ, ff>)> \mmember{} ts-reachable(consensus-ts5(V;A;W)))) supposing (two-intersection(A;W) and 1 < ||W||) By Latex: (Intros THEN Unhide THEN Unfold `ts-reachable` 0 THEN MemTypeCD) Home Index