Proof of Nuprl Lemma : pv11_p1_acc_state_from_p2a

Step * 1 of Lemma pv11_p1_acc_state_from_p2a_fun

1. Cmd : {T:Type| valueall-type(T)} @i'
2. f : pv11_p1_headers_type{i:l}(Cmd)@i'
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))@i'
13. e : E@i
14. ldrs_uid : Id ─→ ℤ@i
15. b : pv11_p1_Ballot_Num()@i
16. s : ℤ@i
17. c : Cmd@i
18. Inj(Id;ℤ;ldrs_uid)@i
19. (<b, s, c> ∈ snd(pv11_p1_AcceptorStateFun(Cmd;ldrs_uid;f;es;e)))@i
⊢ ↓∃e':E
    ∃l:Id
     (e' ≤loc e
     ∧ <l, b, s, c> ∈ pv11_p1_p2a'base(Cmd;f)(e')
     ∧ (b = (fst(pv11_p1_AcceptorStateFun(Cmd;ldrs_uid;f;es;e'))) ∈ pv11_p1_Ballot_Num())
     ∧ (∀e'':E. (e' ≤loc e''  ⇒ e'' ≤loc e  ⇒ (<b, s, c> ∈ snd(pv11_p1_AcceptorStateFun(Cmd;ldrs_uid;f;es;e''))))))
BY
{ (InstLemma `pv11_p1_acc_state_from_p2a` [⌈Cmd⌉;⌈f⌉;⌈es⌉;⌈e⌉;⌈ldrs_uid⌉;

   ⌈<fst(pv11_p1_AcceptorStateFun(Cmd;ldrs_uid;f;es;e)), snd(pv11_p1_AcceptorStateFun(Cmd;ldrs_uid;f;es;e))>⌉;⌈b⌉;⌈s⌉;

   ⌈c⌉]⋅
   THEN Auto
   THEN Try (Complete ((Reduce (-1) THEN D (-1) THEN Auto)))
   THEN (RWO "pair-eta<" 0 THENA Auto)
   THEN BLemma `pv11_p1_AcceptorState-classrel`
   THEN Auto)⋅ }

Latex:

Latex:
1. Cmd : \{T:Type| valueall-type(T)\} @i' 2. f : pv11\_p1\_headers\_type\{i:l\}(Cmd)@i' 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))@i' 13. e : E@i 14. ldrs$_{uid}$ : Id {}\mrightarrow{} \mBbbZ{}@i 15. b : pv11\_p1\_Ballot\_Num()@i 16. s : \mBbbZ{}@i 17. c : Cmd@i 18. Inj(Id;\mBbbZ{};ldrs$_{uid}$)@i 19. (<b, s, c> \mmember{} snd(pv11\_p1\_AcceptorStateFun(Cmd;ldrs$_{uid}$;f;es;e)))@i \mvdash{} \mdownarrow{}\mexists{}e':E \mexists{}l:Id (e' \mleq{}loc e \mwedge{} <l, b, s, c> \mmember{} pv11\_p1\_p2a'base(Cmd;f)(e') \mwedge{} (b = (fst(pv11\_p1\_AcceptorStateFun(Cmd;ldrs$_{uid}$;f;es;e')))) \mwedge{} (\mforall{}e'':E (e' \mleq{}loc e'' {}\mRightarrow{} e'' \mleq{}loc e {}\mRightarrow{} (<b, s, c> \mmember{} snd(pv11\_p1\_AcceptorStateFun(Cmd;ldrs$_{uid}$;f;es;e''\000C)))))) By Latex: (InstLemma `pv11\_p1\_acc\_state\_from\_p2a` [\mkleeneopen{}Cmd\mkleeneclose{};\mkleeneopen{}f\mkleeneclose{};\mkleeneopen{}es\mkleeneclose{};\mkleeneopen{}e\mkleeneclose{};\mkleeneopen{}ldrs$_{uid}$\mkleeneclose{}; \mkleeneopen{}<fst(pv11\_p1\_AcceptorStateFun(Cmd;ldrs$_{uid}$;f;es;e)) , snd(pv11\_p1\_AcceptorStateFun(Cmd;ldrs$_{uid}$;f;es;e)) >\mkleeneclose{};\mkleeneopen{}b\mkleeneclose{};\mkleeneopen{}s\mkleeneclose{};\mkleeneopen{}c\mkleeneclose{}]\mcdot{} THEN Auto THEN Try (Complete ((Reduce (-1) THEN D (-1) THEN Auto))) THEN (RWO "pair-eta<" 0 THENA Auto) THEN BLemma `pv11\_p1\_AcceptorState-classrel` THEN Auto)\mcdot{} Home Index