Proof of Nuprl Lemma : nonce-release-lemma

Step * 1 1 3 1 1 of Lemma nonce-release-lemma

1. ses : SES
2. ActionsDisjoint
3. NoncesCiphersAndKeysDisjoint
4. PropertyO
5. PropertyN
6. ses-ordering'(ses)
7. PropertyF
8. PropertyV
9. PropertyR
10. PropertyD
11. PropertyS
12. PropertyK
13. bss : Basic1 List
14. Legal(bss)
15. A : Id
16. Honest(A)
17. Protocol1(bss) A
18. es : EO+(Info)
19. thr : {thr:Act List| ∀i:ℕ||thr|| - 1. (thr[i] <loc thr[i + 1])}
20. (thr is one of bss at A)
21. loc(thr)= A
22. i : ℕ||thr||
23. j : ℕi
24. ↑thr[j] ∈_b New
25. ∀k:{j + 1..i^-}. (¬↑thr[k] ∈_b Send)
26. loc(thr[j]) = A ∈ Id
27. loc(thr[i]) = A ∈ Id
28. e : E@i
29. ∀e1:E
      ((e1 < e)
      ⇒ Action(e1)
      ⇒ e1 has* New(thr[j])
      ⇒ (((¬(loc(e1) = A ∈ Id)) ⇒ (thr[i] < e1)) ∧ ((e1 <loc thr[i]) ⇒ (e1 ∈ thr ∧ (¬↑e1 ∈_b Send)))))
30. Action(e)@i
31. e has* New(thr[j])@i
32. (¬(loc(e) = A ∈ Id)) ⇒ (thr[i] < e)
33. (e <loc thr[i])@i
34. i1 : ℕ||thr||
35. e = thr[i1] ∈ E
36. ↑thr[i1] ∈_b Send@i
⊢ False
BY
{ Assert ⌜i1 ∈ {j + 1..i^-}⌝⋅ }

1
.....assertion.....
1. ses : SES
2. ActionsDisjoint
3. NoncesCiphersAndKeysDisjoint
4. PropertyO
5. PropertyN
6. ses-ordering'(ses)
7. PropertyF
8. PropertyV
9. PropertyR
10. PropertyD
11. PropertyS
12. PropertyK
13. bss : Basic1 List
14. Legal(bss)
15. A : Id
16. Honest(A)
17. Protocol1(bss) A
18. es : EO+(Info)
19. thr : {thr:Act List| ∀i:ℕ||thr|| - 1. (thr[i] <loc thr[i + 1])}
20. (thr is one of bss at A)
21. loc(thr)= A
22. i : ℕ||thr||
23. j : ℕi
24. ↑thr[j] ∈_b New
25. ∀k:{j + 1..i^-}. (¬↑thr[k] ∈_b Send)
26. loc(thr[j]) = A ∈ Id
27. loc(thr[i]) = A ∈ Id
28. e : E@i
29. ∀e1:E
      ((e1 < e)
      ⇒ Action(e1)
      ⇒ e1 has* New(thr[j])
      ⇒ (((¬(loc(e1) = A ∈ Id)) ⇒ (thr[i] < e1)) ∧ ((e1 <loc thr[i]) ⇒ (e1 ∈ thr ∧ (¬↑e1 ∈_b Send)))))
30. Action(e)@i
31. e has* New(thr[j])@i
32. (¬(loc(e) = A ∈ Id)) ⇒ (thr[i] < e)
33. (e <loc thr[i])@i
34. i1 : ℕ||thr||
35. e = thr[i1] ∈ E
36. ↑thr[i1] ∈_b Send@i
⊢ i1 ∈ {j + 1..i^-}

2
1. ses : SES
2. ActionsDisjoint
3. NoncesCiphersAndKeysDisjoint
4. PropertyO
5. PropertyN
6. ses-ordering'(ses)
7. PropertyF
8. PropertyV
9. PropertyR
10. PropertyD
11. PropertyS
12. PropertyK
13. bss : Basic1 List
14. Legal(bss)
15. A : Id
16. Honest(A)
17. Protocol1(bss) A
18. es : EO+(Info)
19. thr : {thr:Act List| ∀i:ℕ||thr|| - 1. (thr[i] <loc thr[i + 1])}
20. (thr is one of bss at A)
21. loc(thr)= A
22. i : ℕ||thr||
23. j : ℕi
24. ↑thr[j] ∈_b New
25. ∀k:{j + 1..i^-}. (¬↑thr[k] ∈_b Send)
26. loc(thr[j]) = A ∈ Id
27. loc(thr[i]) = A ∈ Id
28. e : E@i
29. ∀e1:E
      ((e1 < e)
      ⇒ Action(e1)
      ⇒ e1 has* New(thr[j])
      ⇒ (((¬(loc(e1) = A ∈ Id)) ⇒ (thr[i] < e1)) ∧ ((e1 <loc thr[i]) ⇒ (e1 ∈ thr ∧ (¬↑e1 ∈_b Send)))))
30. Action(e)@i
31. e has* New(thr[j])@i
32. (¬(loc(e) = A ∈ Id)) ⇒ (thr[i] < e)
33. (e <loc thr[i])@i
34. i1 : ℕ||thr||
35. e = thr[i1] ∈ E
36. ↑thr[i1] ∈_b Send@i
37. i1 ∈ {j + 1..i^-}
⊢ False

Latex:

Latex:
1. ses : SES 2. ActionsDisjoint 3. NoncesCiphersAndKeysDisjoint 4. PropertyO 5. PropertyN 6. ses-ordering'(ses) 7. PropertyF 8. PropertyV 9. PropertyR 10. PropertyD 11. PropertyS 12. PropertyK 13. bss : Basic1 List 14. Legal(bss) 15. A : Id 16. Honest(A) 17. Protocol1(bss) A 18. es : EO+(Info) 19. thr : \{thr:Act List| \mforall{}i:\mBbbN{}||thr|| - 1. (thr[i] <loc thr[i + 1])\} 20. (thr is one of bss at A) 21. loc(thr)= A 22. i : \mBbbN{}||thr|| 23. j : \mBbbN{}i 24. \muparrow{}thr[j] \mmember{}\msubb{} New 25. \mforall{}k:\{j + 1..i\msupminus{}\}. (\mneg{}\muparrow{}thr[k] \mmember{}\msubb{} Send) 26. loc(thr[j]) = A 27. loc(thr[i]) = A 28. e : E@i 29. \mforall{}e1:E ((e1 < e) {}\mRightarrow{} Action(e1) {}\mRightarrow{} e1 has* New(thr[j]) {}\mRightarrow{} (((\mneg{}(loc(e1) = A)) {}\mRightarrow{} (thr[i] < e1)) \mwedge{} ((e1 <loc thr[i]) {}\mRightarrow{} (e1 \mmember{} thr \mwedge{} (\mneg{}\muparrow{}e1 \mmember{}\msubb{} Send))))) 30. Action(e)@i 31. e has* New(thr[j])@i 32. (\mneg{}(loc(e) = A)) {}\mRightarrow{} (thr[i] < e) 33. (e <loc thr[i])@i 34. i1 : \mBbbN{}||thr|| 35. e = thr[i1] 36. \muparrow{}thr[i1] \mmember{}\msubb{} Send@i \mvdash{} False By Latex: Assert \mkleeneopen{}i1 \mmember{} \{j + 1..i\msupminus{}\}\mkleeneclose{}\mcdot{} Home Index