Proof of Nuprl Lemma : Memory-class-progress

Step * 1 1 1 1 1 of Lemma Memory-class-progress

1. [Info] : Type
2. [B] : Type
3. [A] : Type
4. R : B ─→ B ─→ ℙ@i'
5. P : A ─→ B ─→ ℙ@i'
6. f : A ─→ B ─→ B@i
7. init : Id ─→ bag(B)@i
8. X : EClass(A)@i'
9. es : EO+(Info)@i'
10. e1 : E@i
11. e2 : E@i
12. v1 : B@i
13. v2 : B@i
14. ∀a:A. ∀s:B.  Dec(P[a;s])@i
15. Trans(B;x,y.R[x;y])@i
16. ∀s1,s2:B.  SqStable(R[s1;s2])@i
17. ∀a:A. ∀e:E. ∀s:B.
      (e1 ≤loc e
      ⇒ (e <loc e2)
      ⇒ a ∈ X(e)
      ⇒ s ∈ Memory-class(f;init;X)(e)
      ⇒ ((P[a;s] ⇒ R[s;f a s]) ∧ ((¬P[a;s]) ⇒ (s = (f a s) ∈ B))))@i
18. single-valued-classrel(es;X;A)@i
19. single-valued-bag(init loc(e1);B)@i
20. ↑first(e1)
21. v1 ↓∈ init loc(e1)
22. ¬↑first(e2)
23. iterated_classrel(es;B;A;f;init;X;pred(e2);v2)
24. (e1 <loc e2)@i

25. ∃e:E. ∃a:A. ∃s:B. (e1 ≤loc e  ∧ (e <loc e2) ∧ s ∈ Memory-class(f;init;X)(e) ∧ a ∈ X(e) ∧ P[a;s])@i

26. v : A
27. v ∈ X(e1)
28. iterated_classrel(es;B;A;f;init;X;pred(e2);f v v1)
29. loc(pred(e2)) = loc(e2) ∈ Id
30. (pred(e2) < e2)
31. ∀e':E. (e' < e2) ⇒ ((e' = pred(e2) ∈ E) ∨ (e' < pred(e2))) supposing loc(e') = loc(e2) ∈ Id
32. e1 = pred(e2) ∈ E
33. P[v;v1] ⇒ R[v1;f v v1]
34. (¬P[v;v1]) ⇒ (v1 = (f v v1) ∈ B)
35. v2 = (f v v1) ∈ B
⊢ R[v1;v2]
BY
{ (ExRepD
   THEN (InstHyp [⌈e⌉] (-5)⋅ THENA Auto)
   THEN D (-1)
   THEN Try (Complete ((Assert ⌈False⌉⋅ THEN MaAuto)))
   THEN MaUseClassRel (-14)
   THEN Auto) }

1
1. [Info] : Type
2. [B] : Type
3. [A] : Type
4. R : B ─→ B ─→ ℙ@i'
5. P : A ─→ B ─→ ℙ@i'
6. f : A ─→ B ─→ B@i
7. init : Id ─→ bag(B)@i
8. X : EClass(A)@i'
9. es : EO+(Info)@i'
10. e1 : E@i
11. e2 : E@i
12. v1 : B@i
13. v2 : B@i
14. ∀a:A. ∀s:B.  Dec(P[a;s])@i
15. Trans(B;x,y.R[x;y])@i
16. ∀s1,s2:B.  SqStable(R[s1;s2])@i
17. ∀a:A. ∀e:E. ∀s:B.
      (e1 ≤loc e
      ⇒ (e <loc e2)
      ⇒ a ∈ X(e)
      ⇒ s ∈ Memory-class(f;init;X)(e)
      ⇒ ((P[a;s] ⇒ R[s;f a s]) ∧ ((¬P[a;s]) ⇒ (s = (f a s) ∈ B))))@i
18. single-valued-classrel(es;X;A)@i
19. single-valued-bag(init loc(e1);B)@i
20. ↑first(e1)
21. v1 ↓∈ init loc(e1)
22. ¬↑first(e2)
23. iterated_classrel(es;B;A;f;init;X;pred(e2);v2)
24. (e1 <loc e2)@i
25. e : E@i
26. a : A@i
27. s : B@i
28. e1 ≤loc e @i
29. (e <loc e2)@i
30. ↑first(e)
31. s ↓∈ init loc(e)
32. a ∈ X(e)@i
33. P[a;s]@i
34. v : A
35. v ∈ X(e1)
36. iterated_classrel(es;B;A;f;init;X;pred(e2);f v v1)
37. loc(pred(e2)) = loc(e2) ∈ Id
38. (pred(e2) < e2)
39. ∀e':E. (e' < e2) ⇒ ((e' = pred(e2) ∈ E) ∨ (e' < pred(e2))) supposing loc(e') = loc(e2) ∈ Id
40. e1 = pred(e2) ∈ E
41. P[v;v1] ⇒ R[v1;f v v1]
42. (¬P[v;v1]) ⇒ (v1 = (f v v1) ∈ B)
43. v2 = (f v v1) ∈ B
44. e = pred(e2) ∈ E
⊢ R[v1;v2]

Latex:

Latex:
1. [Info] : Type 2. [B] : Type 3. [A] : Type 4. R : B {}\mrightarrow{} B {}\mrightarrow{} \mBbbP{}@i' 5. P : A {}\mrightarrow{} B {}\mrightarrow{} \mBbbP{}@i' 6. f : A {}\mrightarrow{} B {}\mrightarrow{} B@i 7. init : Id {}\mrightarrow{} bag(B)@i 8. X : EClass(A)@i' 9. es : EO+(Info)@i' 10. e1 : E@i 11. e2 : E@i 12. v1 : B@i 13. v2 : B@i 14. \mforall{}a:A. \mforall{}s:B. Dec(P[a;s])@i 15. Trans(B;x,y.R[x;y])@i 16. \mforall{}s1,s2:B. SqStable(R[s1;s2])@i 17. \mforall{}a:A. \mforall{}e:E. \mforall{}s:B. (e1 \mleq{}loc e {}\mRightarrow{} (e <loc e2) {}\mRightarrow{} a \mmember{} X(e) {}\mRightarrow{} s \mmember{} Memory-class(f;init;X)(e) {}\mRightarrow{} ((P[a;s] {}\mRightarrow{} R[s;f a s]) \mwedge{} ((\mneg{}P[a;s]) {}\mRightarrow{} (s = (f a s)))))@i 18. single-valued-classrel(es;X;A)@i 19. single-valued-bag(init loc(e1);B)@i 20. \muparrow{}first(e1) 21. v1 \mdownarrow{}\mmember{} init loc(e1) 22. \mneg{}\muparrow{}first(e2) 23. iterated\_classrel(es;B;A;f;init;X;pred(e2);v2) 24. (e1 <loc e2)@i 25. \mexists{}e:E \mexists{}a:A. \mexists{}s:B. (e1 \mleq{}loc e \mwedge{} (e <loc e2) \mwedge{} s \mmember{} Memory-class(f;init;X)(e) \mwedge{} a \mmember{} X(e) \mwedge{} P[a;s])@i 26. v : A 27. v \mmember{} X(e1) 28. iterated\_classrel(es;B;A;f;init;X;pred(e2);f v v1) 29. loc(pred(e2)) = loc(e2) 30. (pred(e2) < e2) 31. \mforall{}e':E. (e' < e2) {}\mRightarrow{} ((e' = pred(e2)) \mvee{} (e' < pred(e2))) supposing loc(e') = loc(e2) 32. e1 = pred(e2) 33. P[v;v1] {}\mRightarrow{} R[v1;f v v1] 34. (\mneg{}P[v;v1]) {}\mRightarrow{} (v1 = (f v v1)) 35. v2 = (f v v1) \mvdash{} R[v1;v2] By Latex: (ExRepD THEN (InstHyp [\mkleeneopen{}e\mkleeneclose{}] (-5)\mcdot{} THENA Auto) THEN D (-1) THEN Try (Complete ((Assert \mkleeneopen{}False\mkleeneclose{}\mcdot{} THEN MaAuto))) THEN MaUseClassRel (-14) THEN Auto) Home Index