Proof of Nuprl Lemma : system-strongly-realizes

Step * 1 1 1 of Lemma system-strongly-realizes_functionality

.....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. [A] : pEnvType(P.M[P]) ─→ pRunType(P.M[P]) ─→ ℙ
6. [B] : EO+(pMsg(P.M[P])) ─→ ℙ
7. X1 : component(P.M[P]) List@i
8. X2 : LabeledDAG(pInTransit(P.M[P]))@i
9. \\%7 : std-initial(<X1, X2>)@i
10. Y1 : component(P.M[P]) List@i
11. Y2 : LabeledDAG(pInTransit(P.M[P]))@i
12. \\%9 : std-initial(<Y1, Y2>)@i
13. system-equiv(P.M[P];<X1, X2>;<Y1, Y2>)@i
14. assuming(env,r.A[env;r])
<X1, X2> |= eo.B[eo]@i
15. Z1 : component(P.M[P]) List@i
16. Z2 : LabeledDAG(pInTransit(P.M[P]))@i
17. \\%5 : std-initial(<Z1, Z2>)@i
18. f : ℕ||Y1|| ─→ ℕ||Z1||@i
19. increasing(f;||Y1||)@i
20. ∀j:ℕ||Y1||. (Y1[j] = Z1[f j] ∈ component(P.M[P]))@i
21. Y2 ⊆ Z2@i
22. env : pEnvType(P.M[P])@i
23. d : ∀j:ℕ||Z1||. Dec(∃i:ℕ||Y1||. (j = (f i) ∈ ℤ))
⊢ map(λj.case d j of inl(p) => X1[fst(p)] | inr(z) => Z1[j];upto(||Z1||)) ∈ component(P.M[P]) List
BY
{ (Auto THEN Auto') }

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. [A] : pEnvType(P.M[P]) {}\mrightarrow{} pRunType(P.M[P]) {}\mrightarrow{} \mBbbP{} 6. [B] : EO+(pMsg(P.M[P])) {}\mrightarrow{} \mBbbP{} 7. X1 : component(P.M[P]) List@i 8. X2 : LabeledDAG(pInTransit(P.M[P]))@i 9. \mbackslash{}\mbackslash{}\%7 : std-initial(<X1, X2>)@i 10. Y1 : component(P.M[P]) List@i 11. Y2 : LabeledDAG(pInTransit(P.M[P]))@i 12. \mbackslash{}\mbackslash{}\%9 : std-initial(<Y1, Y2>)@i 13. system-equiv(P.M[P];<X1, X2><Y1, Y2>)@i 14. assuming(env,r.A[env;r]) <X1, X2> |= eo.B[eo]@i 15. Z1 : component(P.M[P]) List@i 16. Z2 : LabeledDAG(pInTransit(P.M[P]))@i 17. \mbackslash{}\mbackslash{}\%5 : std-initial(<Z1, Z2>)@i 18. f : \mBbbN{}||Y1|| {}\mrightarrow{} \mBbbN{}||Z1||@i 19. increasing(f;||Y1||)@i 20. \mforall{}j:\mBbbN{}||Y1||. (Y1[j] = Z1[f j])@i 21. Y2 \msubseteq{} Z2@i 22. env : pEnvType(P.M[P])@i 23. d : \mforall{}j:\mBbbN{}||Z1||. Dec(\mexists{}i:\mBbbN{}||Y1||. (j = (f i))) \mvdash{} map(\mlambda{}j.case d j of inl(p) => X1[fst(p)] | inr(z) => Z1[j];upto(||Z1||)) \mmember{} component(P.M[P]) List By Latex: (Auto THEN Auto') Home Index