Proof of Nuprl Lemma : run-event-state-next2

Step * 1 2 1 of Lemma run-event-state-next2

.....assertion.....
1. M : Type ─→ Type
2. Continuous+(P.M[P])
3. n2m : ℕ ─→ pMsg(P.M[P])@i
4. l2m : Id ─→ pMsg(P.M[P])@i
5. S0 : System(P.M[P])@i
6. env : pEnvType(P.M[P])@i
7. n : {1...}
8. x : Id@i
9. v1 : ℕ@i
10. λc.fst(c) = x ∈ component(P.M[P]) ─→ 𝔹
11. v3 : ℕ@i
12. v4 : Id@i
13. (env n pRun(S0;env;n2m;l2m)) = <v1, v3, v4> ∈ (ℕ × ℕ × Id)@i
14. x2 : ℤ × Id@i
15. x5 : pMsg(P.M[P])@i
16. v7 : component(P.M[P]) List@i
17. v8 : LabeledDAG(pInTransit(P.M[P]))@i
18. do-chosen-command(n2m;l2m;n;snd((pRun(S0;env;n2m;l2m) (n - 1)));v1;v3;v4)
= <inl <x2, x, x5>, v7, v8>
∈ (ℤ × Id × Id × pMsg(P.M[P])? × System(P.M[P]))@i
19. G : LabeledDAG(pInTransit(P.M[P]))
20. v7 = (fst(deliver-msg(n;x5;x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))));G))) ∈ (component(P.M[P]) List)
⊢ mapfilter(λc.(snd(c));λc.fst(c) = x;v7)
= rev(mapfilter(λC.(fst(Process-apply(snd(C);x5)));λc.fst(c) = x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))))))
∈ (Process(P.M[P]) List)
BY
{ HypSubst (-1) 0 }

1
1. M : Type ─→ Type
2. Continuous+(P.M[P])
3. n2m : ℕ ─→ pMsg(P.M[P])@i
4. l2m : Id ─→ pMsg(P.M[P])@i
5. S0 : System(P.M[P])@i
6. env : pEnvType(P.M[P])@i
7. n : {1...}
8. x : Id@i
9. v1 : ℕ@i
10. λc.fst(c) = x ∈ component(P.M[P]) ─→ 𝔹
11. v3 : ℕ@i
12. v4 : Id@i
13. (env n pRun(S0;env;n2m;l2m)) = <v1, v3, v4> ∈ (ℕ × ℕ × Id)@i
14. x2 : ℤ × Id@i
15. x5 : pMsg(P.M[P])@i
16. v7 : component(P.M[P]) List@i
17. v8 : LabeledDAG(pInTransit(P.M[P]))@i
18. do-chosen-command(n2m;l2m;n;snd((pRun(S0;env;n2m;l2m) (n - 1)));v1;v3;v4)
= <inl <x2, x, x5>, v7, v8>
∈ (ℤ × Id × Id × pMsg(P.M[P])? × System(P.M[P]))@i
19. G : LabeledDAG(pInTransit(P.M[P]))
20. v7 = (fst(deliver-msg(n;x5;x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))));G))) ∈ (component(P.M[P]) List)
⊢ mapfilter(λc.(snd(c));λc.fst(c) = x;fst(deliver-msg(n;x5;x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))));G)))
= rev(mapfilter(λC.(fst(Process-apply(snd(C);x5)));λc.fst(c) = x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))))))
∈ (Process(P.M[P]) List)

2
.....wf.....
1. M : Type ─→ Type
2. Continuous+(P.M[P])
3. n2m : ℕ ─→ pMsg(P.M[P])@i
4. l2m : Id ─→ pMsg(P.M[P])@i
5. S0 : System(P.M[P])@i
6. env : pEnvType(P.M[P])@i
7. n : {1...}
8. x : Id@i
9. v1 : ℕ@i
10. λc.fst(c) = x ∈ component(P.M[P]) ─→ 𝔹
11. v3 : ℕ@i
12. v4 : Id@i
13. (env n pRun(S0;env;n2m;l2m)) = <v1, v3, v4> ∈ (ℕ × ℕ × Id)@i
14. x2 : ℤ × Id@i
15. x5 : pMsg(P.M[P])@i
16. v7 : component(P.M[P]) List@i
17. v8 : LabeledDAG(pInTransit(P.M[P]))@i
18. do-chosen-command(n2m;l2m;n;snd((pRun(S0;env;n2m;l2m) (n - 1)));v1;v3;v4)
= <inl <x2, x, x5>, v7, v8>
∈ (ℤ × Id × Id × pMsg(P.M[P])? × System(P.M[P]))@i
19. G : LabeledDAG(pInTransit(P.M[P]))
20. v7 = (fst(deliver-msg(n;x5;x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))));G))) ∈ (component(P.M[P]) List)
21. z : component(P.M[P]) List
⊢ mapfilter(λc.(snd(c));λc.fst(c) = x;z)
= rev(mapfilter(λC.(fst(Process-apply(snd(C);x5)));λc.fst(c) = x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))))))
∈ (Process(P.M[P]) List) ∈ ℙ

Latex:

Latex:
.....assertion..... 1. M : Type {}\mrightarrow{} Type 2. Continuous+(P.M[P]) 3. n2m : \mBbbN{} {}\mrightarrow{} pMsg(P.M[P])@i 4. l2m : Id {}\mrightarrow{} pMsg(P.M[P])@i 5. S0 : System(P.M[P])@i 6. env : pEnvType(P.M[P])@i 7. n : \{1...\} 8. x : Id@i 9. v1 : \mBbbN{}@i 10. \mlambda{}c.fst(c) = x \mmember{} component(P.M[P]) {}\mrightarrow{} \mBbbB{} 11. v3 : \mBbbN{}@i 12. v4 : Id@i 13. (env n pRun(S0;env;n2m;l2m)) = <v1, v3, v4>@i 14. x2 : \mBbbZ{} \mtimes{} Id@i 15. x5 : pMsg(P.M[P])@i 16. v7 : component(P.M[P]) List@i 17. v8 : LabeledDAG(pInTransit(P.M[P]))@i 18. do-chosen-command(n2m;l2m;n;snd((pRun(S0;env;n2m;l2m) (n - 1)));v1;v3;v4) = <inl <x2, x, x5>, v7, v8>@i 19. G : LabeledDAG(pInTransit(P.M[P])) 20. v7 = (fst(deliver-msg(n;x5;x;fst(snd((pRun(S0;env;n2m;l2m) (n - 1))));G))) \mvdash{} mapfilter(\mlambda{}c.(snd(c));\mlambda{}c.fst(c) = x;v7) = rev(mapfilter(\mlambda{}C.(fst(Process-apply(snd(C);x5))); \mlambda{}c.fst(c) = x; fst(snd((pRun(S0;env;n2m;l2m) (n - 1)))))) By Latex: HypSubst (-1) 0 Home Index