Proof of Nuprl Lemma : ses-ordering-ordering'

Step * 1 1 1 1 of Lemma ses-ordering-ordering'

1. s : SES@i'
2. PropertyO@i'
3. ActionsDisjoint@i'
4. es : EO+(Info)@i'
5. m : ℕ
6. ∀m:ℕm. ∀b:E.
     ((∀n:E(New). ∀e':E.
         (((e' has New(n)) ∧ (e' ->>^m b))
         ⇒ (n ≤loc b  ∨ (∃snd:E(Send). ((n <loc snd) ∧ (snd < b) ∧ snd has* New(n))))))
     ∧ (∀e1:E(Sign). ∀e':E.
          (((e' has signature(e1)) ∧ (e' ->>^m b))
          ⇒ (∃e2:E(Sign)
               ((Sign(e2) = Sign(e1) ∈ (SecurityData × Id × Atom1))

               ∧ (e2 ≤loc b  ∨ (∃snd:E(Send). ((e2 <loc snd) ∧ (snd < b) ∧ snd has* signature(e1))))))))

     ∧ (∀e1:E(Encrypt). ∀e':E.
          (((e' has cipherText(e1)) ∧ (e' ->>^m b))
          ⇒ (∃e2:E(Encrypt)
               ((Encrypt(e2) = Encrypt(e1) ∈ (SecurityData × Key × Atom1))

               ∧ (e2 ≤loc b  ∨ (∃snd:E(Send). ((e2 <loc snd) ∧ (snd < b) ∧ snd has* cipherText(e1)))))))))@i

7. b : E@i
8. n : E(New)@i
9. e' : E@i
10. (e' has New(n))@i
11. z : E
12. 0 < m
13. e' ->>^m - 1 z
14. ↑z ∈_b Encrypt
15. (b has cipherText(z))
16. ¬n ≤loc b
⊢ ∃snd:E(Send). ((n <loc snd) ∧ (snd < b) ∧ snd has* New(n))
BY
{ ((Assert ∃e2:E(Encrypt)
((Encrypt(e2) = Encrypt(z) ∈ (SecurityData × Key × Atom1))

            ∧ (e2 ≤loc b  ∨ (∃snd:E(Send). ((e2 <loc snd) ∧ (snd < b) ∧ snd has* cipherText(z))))) BY

          ((With ⌈es⌉ (D 2)⋅ THEN Auto) THEN InstHyp [⌈z⌉;⌈b⌉] (-1)⋅ THEN Auto))
   THEN ExRepD
   )⋅ }

1
1. s : SES@i'
2. PropertyO@i'
3. ActionsDisjoint@i'
4. es : EO+(Info)@i'
5. m : ℕ
6. ∀m:ℕm. ∀b:E.
     ((∀n:E(New). ∀e':E.
         (((e' has New(n)) ∧ (e' ->>^m b))
         ⇒ (n ≤loc b  ∨ (∃snd:E(Send). ((n <loc snd) ∧ (snd < b) ∧ snd has* New(n))))))
     ∧ (∀e1:E(Sign). ∀e':E.
          (((e' has signature(e1)) ∧ (e' ->>^m b))
          ⇒ (∃e2:E(Sign)
               ((Sign(e2) = Sign(e1) ∈ (SecurityData × Id × Atom1))

               ∧ (e2 ≤loc b  ∨ (∃snd:E(Send). ((e2 <loc snd) ∧ (snd < b) ∧ snd has* signature(e1))))))))

               ∧ (e2 ≤loc b  ∨ (∃snd:E(Send). ((e2 <loc snd) ∧ (snd < b) ∧ snd has* cipherText(e1)))))))))@i

7. b : E@i
8. n : E(New)@i
9. e' : E@i
10. (e' has New(n))@i
11. z : E
12. 0 < m
13. e' ->>^m - 1 z
14. ↑z ∈_b Encrypt
15. (b has cipherText(z))
16. ¬n ≤loc b
17. e2 : E(Encrypt)
18. Encrypt(e2) = Encrypt(z) ∈ (SecurityData × Key × Atom1)
19. e2 ≤loc b ∨ (∃snd:E(Send). ((e2 <loc snd) ∧ (snd < b) ∧ snd has* cipherText(z)))
⊢ ∃snd:E(Send). ((n <loc snd) ∧ (snd < b) ∧ snd has* New(n))

Latex:

Latex:
1. s : SES@i' 2. PropertyO@i' 3. ActionsDisjoint@i' 4. es : EO+(Info)@i' 5. m : \mBbbN{} 6. \mforall{}m:\mBbbN{}m. \mforall{}b:E. ((\mforall{}n:E(New). \mforall{}e':E. (((e' has New(n)) \mwedge{} (e' rel\_exp(E; ->> m) b)) {}\mRightarrow{} (n \mleq{}loc b \mvee{} (\mexists{}snd:E(Send). ((n <loc snd) \mwedge{} (snd < b) \mwedge{} snd has* New(n)))))) \mwedge{} (\mforall{}e1:E(Sign). \mforall{}e':E. (((e' has signature(e1)) \mwedge{} (e' rel\_exp(E; ->> m) b)) {}\mRightarrow{} (\mexists{}e2:E(Sign) ((Sign(e2) = Sign(e1)) \mwedge{} (e2 \mleq{}loc b \mvee{} (\mexists{}snd:E(Send). ((e2 <loc snd) \mwedge{} (snd < b) \mwedge{} snd has* signature(e1)))))))) \mwedge{} (\mforall{}e1:E(Encrypt). \mforall{}e':E. (((e' has cipherText(e1)) \mwedge{} (e' rel\_exp(E; ->> m) b)) {}\mRightarrow{} (\mexists{}e2:E(Encrypt) ((Encrypt(e2) = Encrypt(e1)) \mwedge{} (e2 \mleq{}loc b \mvee{} (\mexists{}snd:E(Send). ((e2 <loc snd) \mwedge{} (snd < b) \mwedge{} snd has* cipherText(e1)))))))))@i 7. b : E@i 8. n : E(New)@i 9. e' : E@i 10. (e' has New(n))@i 11. z : E 12. 0 < m 13. e' rel\_exp(E; ->> m - 1) z 14. \muparrow{}z \mmember{}\msubb{} Encrypt 15. (b has cipherText(z)) 16. \mneg{}n \mleq{}loc b \mvdash{} \mexists{}snd:E(Send). ((n <loc snd) \mwedge{} (snd < b) \mwedge{} snd has* New(n)) By Latex: ((Assert \mexists{}e2:E(Encrypt) ((Encrypt(e2) = Encrypt(z)) \mwedge{} (e2 \mleq{}loc b \mvee{} (\mexists{}snd:E(Send). ((e2 <loc snd) \mwedge{} (snd < b) \mwedge{} snd has* cipherText(z))))) BY ((With \mkleeneopen{}es\mkleeneclose{} (D 2)\mcdot{} THEN Auto) THEN InstHyp [\mkleeneopen{}z\mkleeneclose{};\mkleeneopen{}b\mkleeneclose{}] (-1)\mcdot{} THEN Auto)) THEN ExRepD )\mcdot{} Home Index