Proof of Nuprl Lemma : consensus-ts3-invariant1

Step * 1 2 2 2 1 1 1 1 of Lemma consensus-ts3-invariant1

1. V : Type@i'
2. L : consensus-state3(V) List@i
3. y : consensus-state3(V) List@i
4. ∀v:V
     (((CONSIDERING[v] ∈ L) ∨ (COMMITED[v] ∈ L))
     ⇒ (∀v':V. (((CONSIDERING[v'] ∈ L) ∨ (COMMITED[v'] ∈ L)) ⇒ (v' = v ∈ V))))@i
5. ||y|| = ||L|| ∈ ℤ@i
6. i : ℕ||L||@i
7. ∀j:ℕ||L||. ((¬(j = i ∈ ℤ)) ⇒ (y[j] = L[j] ∈ consensus-state3(V)))@i
8. v1 : V@i
9. L[i] = CONSIDERING[v1] ∈ consensus-state3(V)@i
10. y[i] = COMMITED[v1] ∈ consensus-state3(V)@i
11. v : V@i
12. (CONSIDERING[v] ∈ y)@i
⊢ (CONSIDERING[v] ∈ L)
BY
{ (RepeatFor 2 (D -1)
   THEN Unfold `l_member` 0
   THEN InstConcl [⌈i1⌉]⋅
   THEN Auto
   THEN InstHyp [⌈i1⌉] 7⋅
   THEN Auto
   THEN D 0
   THEN Auto
   THEN HypSubst' (-1) (-2)
   THEN HypSubst' 10 (-2)
   THEN Auto) }

1
1. V : Type@i'
2. L : consensus-state3(V) List@i
3. y : consensus-state3(V) List@i
4. ∀v:V
     (((CONSIDERING[v] ∈ L) ∨ (COMMITED[v] ∈ L))
     ⇒ (∀v':V. (((CONSIDERING[v'] ∈ L) ∨ (COMMITED[v'] ∈ L)) ⇒ (v' = v ∈ V))))@i
5. ||y|| = ||L|| ∈ ℤ@i
6. i : ℕ||L||@i
7. ∀j:ℕ||L||. ((¬(j = i ∈ ℤ)) ⇒ (y[j] = L[j] ∈ consensus-state3(V)))@i
8. v1 : V@i
9. L[i] = CONSIDERING[v1] ∈ consensus-state3(V)@i
10. y[i] = COMMITED[v1] ∈ consensus-state3(V)@i
11. v : V@i
12. i1 : ℕ@i
13. i1 < ||y||@i
14. CONSIDERING[v] = y[i1] ∈ consensus-state3(V)@i
15. i < ||L||
16. i1 = i ∈ ℤ@i
⊢ False

Latex:

1. V : Type@i' 2. L : consensus-state3(V) List@i 3. y : consensus-state3(V) List@i 4. \mforall{}v:V (((CONSIDERING[v] \mmember{} L) \mvee{} (COMMITED[v] \mmember{} L)) {}\mRightarrow{} (\mforall{}v':V. (((CONSIDERING[v'] \mmember{} L) \mvee{} (COMMITED[v'] \mmember{} L)) {}\mRightarrow{} (v' = v))))@i 5. ||y|| = ||L||@i 6. i : \mBbbN{}||L||@i 7. \mforall{}j:\mBbbN{}||L||. ((\mneg{}(j = i)) {}\mRightarrow{} (y[j] = L[j]))@i 8. v1 : V@i 9. L[i] = CONSIDERING[v1]@i 10. y[i] = COMMITED[v1]@i 11. v : V@i 12. (CONSIDERING[v] \mmember{} y)@i \mvdash{} (CONSIDERING[v] \mmember{} L) By (RepeatFor 2 (D -1) THEN Unfold `l\_member` 0 THEN InstConcl [\mkleeneopen{}i1\mkleeneclose{}]\mcdot{} THEN Auto THEN InstHyp [\mkleeneopen{}i1\mkleeneclose{}] 7\mcdot{} THEN Auto THEN D 0 THEN Auto THEN HypSubst' (-1) (-2) THEN HypSubst' 10 (-2) THEN Auto) Home Index