Proof of Nuprl Lemma : consensus-refinement4

Step * 1 1 1 2 1 of Lemma consensus-refinement4

1. [V] : Type
2. ∀v1,v2:V. Dec(v1 = v2 ∈ V)@i
3. ∃v,v':V. (¬(v = v' ∈ V))@i
4. A : Id List@i
5. W : {a:Id| (a ∈ A)} List List@i
6. 1 < ||W||@i
7. two-intersection(A;W)@i
8. u : Id@i
9. v : Id List@i
10. (u ∈ A)
11. v ⊆ A
12. (λa.<-1, ⊗>) ((λx,y. CR[x,y])^*) (λa.if a ∈_b v then <0, ⊗> else <-1, ⊗> fi )@i
⊢ (λa.<-1, ⊗>) ((λx,y. CR[x,y])^*) (λa.if a ∈_b [u / v] then <0, ⊗> else <-1, ⊗> fi )
BY

{ ((Using [`y',⌜λa.if a ∈_b v then <0, ⊗> else <-1, ⊗> fi ⌝] (BLemma `rel_star_transitivity`)⋅ THENM Try (Trivial))

   THENA (Auto THEN RepUR ``consensus-state4`` 0 THEN Auto)
   ) }

1
1. [V] : Type
2. ∀v1,v2:V.  Dec(v1 = v2 ∈ V)@i
3. ∃v,v':V. (¬(v = v' ∈ V))@i
4. A : Id List@i
5. W : {a:Id| (a ∈ A)}  List List@i
6. 1 < ||W||@i
7. two-intersection(A;W)@i
8. u : Id@i
9. v : Id List@i
10. (u ∈ A)
11. v ⊆ A
12. (λa.<-1, ⊗>) ((λx,y. CR[x,y])^*) (λa.if a ∈_b v then <0, ⊗> else <-1, ⊗> fi )@i

⊢ (λa.if a ∈_b v then <0, ⊗> else <-1, ⊗> fi ) ((λx,y. CR[x,y])^*) (λa.if a ∈_b [u / v] then <0, ⊗> else <-1, ⊗> fi )

Latex:

Latex:
1. [V] : Type 2. \mforall{}v1,v2:V. Dec(v1 = v2)@i 3. \mexists{}v,v':V. (\mneg{}(v = v'))@i 4. A : Id List@i 5. W : \{a:Id| (a \mmember{} A)\} List List@i 6. 1 < ||W||@i 7. two-intersection(A;W)@i 8. u : Id@i 9. v : Id List@i 10. (u \mmember{} A) 11. v \msubseteq{} A 12. (\mlambda{}a.<-1, \motimes{}>) rel\_star(ConsensusState; \mlambda{}x,y. CR[x,y]) (\mlambda{}a.if a \mmember{}\msubb{} v then ɘ, \motimes{}> else <-1, \motimes{}> fi )\000C@i \mvdash{} (\mlambda{}a.<-1, \motimes{}>) rel\_star(ConsensusState; \mlambda{}x,y. CR[x,y]) (\mlambda{}a.if a \mmember{}\msubb{} [u / v] then ɘ, \motimes{}> else <-1, \motimes{}> \000Cfi ) By Latex: ((Using [`y',\mkleeneopen{}\mlambda{}a.if a \mmember{}\msubb{} v then ɘ, \motimes{}> else <-1, \motimes{}> fi \mkleeneclose{}] (BLemma `rel\_star\_transitivity`)\mcdot{} THENM Try (Trivial) ) THENA (Auto THEN RepUR ``consensus-state4`` 0 THEN Auto) ) Home Index