Proof of Nuprl Lemma : decidable__cs-inning-two-committable

Step * 1 of Lemma decidable__cs-inning-two-committable

1. [V] : Type
2. ∃v,v':V. (¬(v = v' ∈ V))@i
3. ∀v,v':V. Dec(v = v' ∈ V)@i
4. A : Id List@i
5. W : {a:Id| (a ∈ A)} List List@i
6. one-intersection(A;W)@i
7. s : ConsensusState@i
8. i : ℤ@i
9. Dec(∃v:V. in state s, inning i could commit v )

⊢ Dec(∃v,v':V. ((¬(v = v' ∈ V)) ∧ in state s, inning i could commit v  ∧ in state s, inning i could commit v' ))

BY
{ D -1 }

1
1. [V] : Type
2. ∃v,v':V. (¬(v = v' ∈ V))@i
3. ∀v,v':V. Dec(v = v' ∈ V)@i
4. A : Id List@i
5. W : {a:Id| (a ∈ A)} List List@i
6. one-intersection(A;W)@i
7. s : ConsensusState@i
8. i : ℤ@i
9. ∃v:V. in state s, inning i could commit v

⊢ Dec(∃v,v':V. ((¬(v = v' ∈ V)) ∧ in state s, inning i could commit v  ∧ in state s, inning i could commit v' ))

2
1. [V] : Type
2. ∃v,v':V. (¬(v = v' ∈ V))@i
3. ∀v,v':V. Dec(v = v' ∈ V)@i
4. A : Id List@i
5. W : {a:Id| (a ∈ A)} List List@i
6. one-intersection(A;W)@i
7. s : ConsensusState@i
8. i : ℤ@i
9. ¬(∃v:V. in state s, inning i could commit v )

⊢ Dec(∃v,v':V. ((¬(v = v' ∈ V)) ∧ in state s, inning i could commit v  ∧ in state s, inning i could commit v' ))

Latex:

1. [V] : Type 2. \mexists{}v,v':V. (\mneg{}(v = v'))@i 3. \mforall{}v,v':V. Dec(v = v')@i 4. A : Id List@i 5. W : \{a:Id| (a \mmember{} A)\} List List@i 6. one-intersection(A;W)@i 7. s : ConsensusState@i 8. i : \mBbbZ{}@i 9. Dec(\mexists{}v:V. in state s, inning i could commit v ) \mvdash{} Dec(\mexists{}v,v':V ((\mneg{}(v = v')) \mwedge{} in state s, inning i could commit v \mwedge{} in state s, inning i could commit v' )) By D -1 Home Index