Proof of Nuprl Lemma : cs-ref-map3-ambivalent

Step * 1 1 1 1 of Lemma cs-ref-map3-ambivalent

1. V : Type@i'
2. L : consensus-state3(V) List@i
3. ∀[v:V]
     ∀[v':V]. v' = v ∈ V supposing (CONSIDERING[v'] ∈ L) ∨ (COMMITED[v'] ∈ L)
     supposing (CONSIDERING[v] ∈ L) ∨ (COMMITED[v] ∈ L)
4. ∀v:V. ((COMMITED[v] ∈ L) ⇐⇒ cs-ref-map3(L) = Decided[v] ∈ consensus-state2(V))
5. ∀v:V
     ((∀v':V. (¬(COMMITED[v'] ∈ L))) ∧ (CONSIDERING[v] ∈ L) ⇐⇒ cs-ref-map3(L) = PREDECIDED[v] ∈ consensus-state2(V))
6. ∀[v:V]. (¬(COMMITED[v] ∈ L))@i
7. ∀[v:V]. (¬(CONSIDERING[v] ∈ L))@i
8. filter(λx.cs-is-committed(x);L) = [] ∈ (consensus-state3(V) List)
9. filter(λx.cs-is-considering(x);L) = [] ∈ (consensus-state3(V) List)
⊢ uiff(True;∀[i:ℕ||L||]. (¬↑cs-is-considering(L[i])))
⇒ uiff(True;∀[i:ℕ||L||]. (¬↑cs-is-committed(L[i])))
⇒ (AMBIVALENT = AMBIVALENT ∈ consensus-state2(V))
BY
{ Auto }

Latex:

1. V : Type@i' 2. L : consensus-state3(V) List@i 3. \mforall{}[v:V] \mforall{}[v':V]. v' = v supposing (CONSIDERING[v'] \mmember{} L) \mvee{} (COMMITED[v'] \mmember{} L) supposing (CONSIDERING[v] \mmember{} L) \mvee{} (COMMITED[v] \mmember{} L) 4. \mforall{}v:V. ((COMMITED[v] \mmember{} L) \mLeftarrow{}{}\mRightarrow{} cs-ref-map3(L) = Decided[v]) 5. \mforall{}v:V. ((\mforall{}v':V. (\mneg{}(COMMITED[v'] \mmember{} L))) \mwedge{} (CONSIDERING[v] \mmember{} L) \mLeftarrow{}{}\mRightarrow{} cs-ref-map3(L) = PREDECIDED[v]) 6. \mforall{}[v:V]. (\mneg{}(COMMITED[v] \mmember{} L))@i 7. \mforall{}[v:V]. (\mneg{}(CONSIDERING[v] \mmember{} L))@i 8. filter(\mlambda{}x.cs-is-committed(x);L) = [] 9. filter(\mlambda{}x.cs-is-considering(x);L) = [] \mvdash{} uiff(True;\mforall{}[i:\mBbbN{}||L||]. (\mneg{}\muparrow{}cs-is-considering(L[i]))) {}\mRightarrow{} uiff(True;\mforall{}[i:\mBbbN{}||L||]. (\mneg{}\muparrow{}cs-is-committed(L[i]))) {}\mRightarrow{} (AMBIVALENT = AMBIVALENT) By Auto Home Index