Proof of Nuprl Lemma : fresh-inning-reachable

Step * 1 2 1 of Lemma fresh-inning-reachable

1. [V] : Type
2. A : Id List@i
3. W : {a:Id| (a ∈ A)} List List@i
4. ws : {a:Id| (a ∈ A)} List@i
5. x : ConsensusState@i
6. i : ℤ@i
7. (ws ∈ W)@i
8. (∀a∈ws.Inning(x;a) < i)
9. n : ℤ@i
10. \\%3 : 0 < n@i

11. x ((λx,y. CR(in ws)[x, y] )^*) (λa.<if a ∈_b firstn(n - 1;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>\000C)@i

⊢ (λa.<if a ∈_b firstn(n - 1;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>)
  ((λx,y. CR(in ws)[x, y] )^*)
  (λa.<if a ∈_b firstn(n;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>)
BY
{ ((Assert Dec(n - 1 < ||A|| c∧ ((A[n - 1] ∈ ws) ∧ (¬(A[n - 1] ∈ firstn(n - 1;A))))) BY
          (BLemmaUp `decidable__cand` THEN Auto))
   THEN D -1
   ) }

1
1. [V] : Type
2. A : Id List@i
3. W : {a:Id| (a ∈ A)}  List List@i
4. ws : {a:Id| (a ∈ A)}  List@i
5. x : ConsensusState@i
6. i : ℤ@i
7. (ws ∈ W)@i
8. (∀a∈ws.Inning(x;a) < i)
9. n : ℤ@i
10. \\%3 : 0 < n@i

11. x ((λx,y. CR(in ws)[x, y] )^*) (λa.<if a ∈_b firstn(n - 1;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>\000C)@i

12. n - 1 < ||A|| c∧ ((A[n - 1] ∈ ws) ∧ (¬(A[n - 1] ∈ firstn(n - 1;A))))
⊢ (λa.<if a ∈_b firstn(n - 1;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>)
  ((λx,y. CR(in ws)[x, y] )^*)
  (λa.<if a ∈_b firstn(n;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>)

2
1. [V] : Type
2. A : Id List@i
3. W : {a:Id| (a ∈ A)}  List List@i
4. ws : {a:Id| (a ∈ A)}  List@i
5. x : ConsensusState@i
6. i : ℤ@i
7. (ws ∈ W)@i
8. (∀a∈ws.Inning(x;a) < i)
9. n : ℤ@i
10. \\%3 : 0 < n@i

11. x ((λx,y. CR(in ws)[x, y] )^*) (λa.<if a ∈_b firstn(n - 1;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>\000C)@i

12. ¬(n - 1 < ||A|| c∧ ((A[n - 1] ∈ ws) ∧ (¬(A[n - 1] ∈ firstn(n - 1;A)))))
⊢ (λa.<if a ∈_b firstn(n - 1;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>)
((λx,y. CR(in ws)[x, y] )^*)
(λa.<if a ∈_b firstn(n;A)) ∧_b a ∈_b ws) then i else Inning(x;a) fi , Estimate(x;a)>)

Latex:

1. [V] : Type 2. A : Id List@i 3. W : \{a:Id| (a \mmember{} A)\} List List@i 4. ws : \{a:Id| (a \mmember{} A)\} List@i 5. x : ConsensusState@i 6. i : \mBbbZ{}@i 7. (ws \mmember{} W)@i 8. (\mforall{}a\mmember{}ws.Inning(x;a) < i) 9. n : \mBbbZ{}@i 10. \mbackslash{}\mbackslash{}\%3 : 0 < n@i 11. x rel\_star(ConsensusState; \mlambda{}x,y. CR(in ws)[x, y] ) (\mlambda{}a.<if a \mmember{}\msubb{} firstn(n - 1;A)) \mwedge{}\msubb{} a \mmember{}\msubb{} ws) then i else Inning(x;a) fi , Estimate(x;a)>)@i \mvdash{} (\mlambda{}a.<if a \mmember{}\msubb{} firstn(n - 1;A)) \mwedge{}\msubb{} a \mmember{}\msubb{} ws) then i else Inning(x;a) fi , Estimate(x;a)>) rel\_star(ConsensusState; \mlambda{}x,y. CR(in ws)[x, y] ) (\mlambda{}a.<if a \mmember{}\msubb{} firstn(n;A)) \mwedge{}\msubb{} a \mmember{}\msubb{} ws) then i else Inning(x;a) fi , Estimate(x;a)>) By ((Assert Dec(n - 1 < ||A|| c\mwedge{} ((A[n - 1] \mmember{} ws) \mwedge{} (\mneg{}(A[n - 1] \mmember{} firstn(n - 1;A))))) BY (BLemmaUp `decidable\_\_cand` THEN Auto)) THEN D -1 ) Home Index