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

Step * 1 1 6 1 of Lemma cs-ref-map3-decided

1. [V] : Type
2. L : consensus-state3(V) List@i
3. v : V@i
4. ∀[v':V]. v' = v ∈ V supposing (CONSIDERING[v'] ∈ L) ∨ (COMMITED[v'] ∈ L)
supposing (CONSIDERING[v] ∈ L) ∨ (COMMITED[v] ∈ L)
5. ¬(filter(λx.cs-is-committed(x);L) = [] ∈ (consensus-state3(V) List))
6. False supposing ∀[i:ℕ||L||]. (¬↑cs-is-committed(L[i]))@i
7. cs-committed-val(hd(filter(λx.cs-is-committed(x);L))) = v ∈ V
⊢ (COMMITED[v] ∈ L)
BY
{ (RevHypSubst (-1) 0 THEN Auto) }

1
1. [V] : Type
2. L : consensus-state3(V) List@i
3. v : V@i
4. ∀[v':V]. v' = v ∈ V supposing (CONSIDERING[v'] ∈ L) ∨ (COMMITED[v'] ∈ L)
supposing (CONSIDERING[v] ∈ L) ∨ (COMMITED[v] ∈ L)
5. ¬(filter(λx.cs-is-committed(x);L) = [] ∈ (consensus-state3(V) List))
6. False supposing ∀[i:ℕ||L||]. (¬↑cs-is-committed(L[i]))@i
7. cs-committed-val(hd(filter(λx.cs-is-committed(x);L))) = v ∈ V
⊢ (COMMITED[cs-committed-val(hd(filter(λx.cs-is-committed(x);L)))] ∈ L)

Latex:

1. [V] : Type 2. L : consensus-state3(V) List@i 3. v : V@i 4. \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) 5. \mneg{}(filter(\mlambda{}x.cs-is-committed(x);L) = []) 6. False supposing \mforall{}[i:\mBbbN{}||L||]. (\mneg{}\muparrow{}cs-is-committed(L[i]))@i 7. cs-committed-val(hd(filter(\mlambda{}x.cs-is-committed(x);L))) = v \mvdash{} (COMMITED[v] \mmember{} L) By (RevHypSubst (-1) 0 THEN Auto) Home Index