Proof of Nuprl Lemma : pv11_p1_commander_state_fun

Step * 1 1 of Lemma pv11_p1_commander_state_fun_eq

1. Cmd : {T:Type| valueall-type(T)}
2. f : pv11_p1_headers_type{i:l}(Cmd)
3. (f [decision]) = (ℤ × Cmd) ∈ Type
4. (f [propose]) = (ℤ × Cmd) ∈ Type

5. (f ``pv11_p1 adopted``) = (pv11_p1_Ballot_Num() × ((pv11_p1_Ballot_Num() × ℤ × Cmd) List)) ∈ Type

6. (f ``pv11_p1 preempted``) = pv11_p1_Ballot_Num() ∈ Type
7. (f ``pv11_p1 p2b``) = (Id × pv11_p1_Ballot_Num() × ℤ × pv11_p1_Ballot_Num()) ∈ Type
8. (f ``pv11_p1 p2a``) = (Id × pv11_p1_Ballot_Num() × ℤ × Cmd) ∈ Type
9. (f ``pv11_p1 p1b``)
= (Id × pv11_p1_Ballot_Num() × pv11_p1_Ballot_Num() × ((pv11_p1_Ballot_Num() × ℤ × Cmd) List))
∈ Type
10. (f ``pv11_p1 p1a``) = (Id × pv11_p1_Ballot_Num()) ∈ Type
11. f ∈ Name ─→ Type
12. es : EO+(Message(f))
13. e : E
14. accpts : bag(Id)
15. b : pv11_p1_Ballot_Num()
16. s : ℤ
⊢ state-class1(λloc.accpts;pv11_p1_on_p2b() b s;pv11_p1_p2b'base(Cmd;f))(e)
= if e ∈_b pv11_p1_p2b'base(Cmd;f)
    then if first(e)
         then pv11_p1_on_p2b() b s loc(e) pv11_p1_p2b'base(Cmd;f)@e accpts
         else pv11_p1_on_p2b() b s loc(e) pv11_p1_p2b'base(Cmd;f)@e
              state-class1(λloc.accpts;pv11_p1_on_p2b() b s;pv11_p1_p2b'base(Cmd;f))(pred(e))
         fi
  if first(e) then accpts
  else state-class1(λloc.accpts;pv11_p1_on_p2b() b s;pv11_p1_p2b'base(Cmd;f))(pred(e))
  fi
∈ bag(Id)
BY
{ ((RW (AddrC [2] (LemmaC `state-class1-fun-eq`)) 0 THENA (Auto THEN ProveFunctional THEN Auto))
   THEN Repeat (AutoSplit)
   THEN Auto
   THEN ProveFunctional
   THEN Auto) }

Latex:

Latex:
1. Cmd : \{T:Type| valueall-type(T)\} 2. f : pv11\_p1\_headers\_type\{i:l\}(Cmd) 3. (f [decision]) = (\mBbbZ{} \mtimes{} Cmd) 4. (f [propose]) = (\mBbbZ{} \mtimes{} Cmd) 5. (f ``pv11\_p1 adopted``) = (pv11\_p1\_Ballot\_Num() \mtimes{} ((pv11\_p1\_Ballot\_Num() \mtimes{} \mBbbZ{} \mtimes{} Cmd) List)) 6. (f ``pv11\_p1 preempted``) = pv11\_p1\_Ballot\_Num() 7. (f ``pv11\_p1 p2b``) = (Id \mtimes{} pv11\_p1\_Ballot\_Num() \mtimes{} \mBbbZ{} \mtimes{} pv11\_p1\_Ballot\_Num()) 8. (f ``pv11\_p1 p2a``) = (Id \mtimes{} pv11\_p1\_Ballot\_Num() \mtimes{} \mBbbZ{} \mtimes{} Cmd) 9. (f ``pv11\_p1 p1b``) = (Id \mtimes{} pv11\_p1\_Ballot\_Num() \mtimes{} pv11\_p1\_Ballot\_Num() \mtimes{} ((pv11\_p1\_Ballot\_Num() \mtimes{} \mBbbZ{} \mtimes{} Cmd) List)) 10. (f ``pv11\_p1 p1a``) = (Id \mtimes{} pv11\_p1\_Ballot\_Num()) 11. f \mmember{} Name {}\mrightarrow{} Type 12. es : EO+(Message(f)) 13. e : E 14. accpts : bag(Id) 15. b : pv11\_p1\_Ballot\_Num() 16. s : \mBbbZ{} \mvdash{} state-class1(\mlambda{}loc.accpts;pv11\_p1\_on\_p2b() b s;pv11\_p1\_p2b'base(Cmd;f))(e) = if e \mmember{}\msubb{} pv11\_p1\_p2b'base(Cmd;f) then if first(e) then pv11\_p1\_on\_p2b() b s loc(e) pv11\_p1\_p2b'base(Cmd;f)@e accpts else pv11\_p1\_on\_p2b() b s loc(e) pv11\_p1\_p2b'base(Cmd;f)@e state-class1(\mlambda{}loc.accpts;pv11\_p1\_on\_p2b() b s;pv11\_p1\_p2b'base(Cmd;f))(pred(e)) fi if first(e) then accpts else state-class1(\mlambda{}loc.accpts;pv11\_p1\_on\_p2b() b s;pv11\_p1\_p2b'base(Cmd;f))(pred(e)) fi By Latex: ((RW (AddrC [2] (LemmaC `state-class1-fun-eq`)) 0 THENA (Auto THEN ProveFunctional THEN Auto)) THEN Repeat (AutoSplit) THEN Auto THEN ProveFunctional THEN Auto) Home Index