Proof of Nuprl Lemma : member-graph-rcvs

Step * of Lemma member-graph-rcvs

∀S:Id List. ∀G:Graph(S). ∀a:Id ⟶ Id ⟶ Id. ∀b:Id. ∀j:{j:Id| (j ∈ S)} . ∀k:Knd.
  ((k ∈ graph-rcvs(S;G;a;b;j)) ⇐⇒ ∃i:Id. ((i ∈ S) ∧ (i⟶j)∈G ∧ (k = rcv((link(a i j) from i to j),b) ∈ Knd)))
BY
{ ((UnivCD THENA Auto)
   THEN (Assert S ∈ {j:Id| (j ∈ S)}  List BY
               Auto)
   THEN Unfold `id-graph` 2

   THEN ((Unfolds ``graph-rcvs id-graph-edge`` 0 THEN RWO  "member_map_filter" 0) THENA Try (Complete (Auto)))

   THEN Reduce 0
   THEN Auto
   THEN (ParallelLast THEN Auto)⋅) }

1
1. S : Id List@i
2. G : {i:Id| (i ∈ S)}  ⟶ ({i:Id| (i ∈ S)}  List)@i
3. a : Id ⟶ Id ⟶ Id@i
4. b : Id@i
5. j : {j:Id| (j ∈ S)} @i
6. k : Knd@i
7. S ∈ {j:Id| (j ∈ S)}  List
8. y : {j:Id| (j ∈ S)} @i
9. (y ∈ S)@i
10. (↑j ∈_b G y) c∧ (k = rcv((link(a y j) from y to j),b) ∈ Knd)@i
11. (y ∈ S)
⊢ (j ∈ G y)

Latex:

Latex:
\mforall{}S:Id List. \mforall{}G:Graph(S). \mforall{}a:Id {}\mrightarrow{} Id {}\mrightarrow{} Id. \mforall{}b:Id. \mforall{}j:\{j:Id| (j \mmember{} S)\} . \mforall{}k:Knd. ((k \mmember{} graph-rcvs(S;G;a;b;j)) \mLeftarrow{}{}\mRightarrow{} \mexists{}i:Id. ((i \mmember{} S) \mwedge{} (i{}\mrightarrow{}j)\mmember{}G \mwedge{} (k = rcv((link(a i j) from i to j),b)))) By Latex: ((UnivCD THENA Auto) THEN (Assert S \mmember{} \{j:Id| (j \mmember{} S)\} List BY Auto) THEN Unfold `id-graph` 2 THEN ((Unfolds ``graph-rcvs id-graph-edge`` 0 THEN RWO "member\_map\_filter" 0) THENA Try (Complete (Auto)) ) THEN Reduce 0 THEN Auto THEN (ParallelLast THEN Auto)\mcdot{}) Home Index