Step
*
1
of Lemma
cabal-theorem
1. s : SES@i'
2. A : SecurityAxioms@i'
3. s2 : Top@i'
4. es : EO+(Info)@i'
5. C : Id List@i
6. (∀A@0∈C.Honest(A@0))
7. ns : Atom1 List@i
8. (∀a∈ns.(∃i∈C. ∃e:E
((loc(e) = i ∈ Id)
∧ (((↑e ∈b New) ∧ (a = New(e) ∈ Atom1))
∨ ((↑e ∈b Encrypt) ∧ (a = cipherText(e) ∈ Atom1) ∧ (∃b∈ns. (¬(b = a ∈ Atom1)) ∧ (e has b))))))
∧ (∀e:E(Send). ((loc(e) ∈ C) ⇒ (¬(e has a))))
∧ (∀e:E(Encrypt)
((loc(e) ∈ C)
⇒ (e has a)
⇒ ((∃A∈C. key(e) = PublicKey(A) ∈ Key)
∨ (∃k∈ns. key(e) = symmetric-key(k) ∈ Key)
∨ (cipherText(e) ∈ ns)))))@i
9. PropertyF
10. e : E@i
11. ∀e1:E. ((e1 < e) ⇒ (∃a∈ns. (e1 has a)) ⇒ (loc(e1) ∈ C))
12. a : Atom1
13. (a ∈ ns)
14. (e has a)
⊢ (loc(e) ∈ C)
BY
{ Assert ⌜∀x,y:E. ∀a:Atom1. (ses-flow(s;es;a;x;y) ⇒ y c≤ e ⇒ (a ∈ ns) ⇒ (loc(x) ∈ C) ⇒ (loc(y) ∈ C))⌝⋅ }
1
.....assertion.....
1. s : SES@i'
2. A : SecurityAxioms@i'
3. s2 : Top@i'
4. es : EO+(Info)@i'
5. C : Id List@i
6. (∀A@0∈C.Honest(A@0))
7. ns : Atom1 List@i
8. (∀a∈ns.(∃i∈C. ∃e:E
((loc(e) = i ∈ Id)
∧ (((↑e ∈b New) ∧ (a = New(e) ∈ Atom1))
∨ ((↑e ∈b Encrypt) ∧ (a = cipherText(e) ∈ Atom1) ∧ (∃b∈ns. (¬(b = a ∈ Atom1)) ∧ (e has b))))))
∧ (∀e:E(Send). ((loc(e) ∈ C) ⇒ (¬(e has a))))
∧ (∀e:E(Encrypt)
((loc(e) ∈ C)
⇒ (e has a)
⇒ ((∃A∈C. key(e) = PublicKey(A) ∈ Key)
∨ (∃k∈ns. key(e) = symmetric-key(k) ∈ Key)
∨ (cipherText(e) ∈ ns)))))@i
9. PropertyF
10. e : E@i
11. ∀e1:E. ((e1 < e) ⇒ (∃a∈ns. (e1 has a)) ⇒ (loc(e1) ∈ C))
12. a : Atom1
13. (a ∈ ns)
14. (e has a)
⊢ ∀x,y:E. ∀a:Atom1. (ses-flow(s;es;a;x;y) ⇒ y c≤ e ⇒ (a ∈ ns) ⇒ (loc(x) ∈ C) ⇒ (loc(y) ∈ C))
2
1. s : SES@i'
2. A : SecurityAxioms@i'
3. s2 : Top@i'
4. es : EO+(Info)@i'
5. C : Id List@i
6. (∀A@0∈C.Honest(A@0))
7. ns : Atom1 List@i
8. (∀a∈ns.(∃i∈C. ∃e:E
((loc(e) = i ∈ Id)
∧ (((↑e ∈b New) ∧ (a = New(e) ∈ Atom1))
∨ ((↑e ∈b Encrypt) ∧ (a = cipherText(e) ∈ Atom1) ∧ (∃b∈ns. (¬(b = a ∈ Atom1)) ∧ (e has b))))))
∧ (∀e:E(Send). ((loc(e) ∈ C) ⇒ (¬(e has a))))
∧ (∀e:E(Encrypt)
((loc(e) ∈ C)
⇒ (e has a)
⇒ ((∃A∈C. key(e) = PublicKey(A) ∈ Key)
∨ (∃k∈ns. key(e) = symmetric-key(k) ∈ Key)
∨ (cipherText(e) ∈ ns)))))@i
9. PropertyF
10. e : E@i
11. ∀e1:E. ((e1 < e) ⇒ (∃a∈ns. (e1 has a)) ⇒ (loc(e1) ∈ C))
12. a : Atom1
13. (a ∈ ns)
14. (e has a)
15. ∀x,y:E. ∀a:Atom1. (ses-flow(s;es;a;x;y) ⇒ y c≤ e ⇒ (a ∈ ns) ⇒ (loc(x) ∈ C) ⇒ (loc(y) ∈ C))
⊢ (loc(e) ∈ C)
Latex:
Latex:
1. s : SES@i'
2. A : SecurityAxioms@i'
3. s2 : Top@i'
4. es : EO+(Info)@i'
5. C : Id List@i
6. (\mforall{}A@0\mmember{}C.Honest(A@0))
7. ns : Atom1 List@i
8. (\mforall{}a\mmember{}ns.(\mexists{}i\mmember{}C. \mexists{}e:E
((loc(e) = i)
\mwedge{} (((\muparrow{}e \mmember{}\msubb{} New) \mwedge{} (a = New(e)))
\mvee{} ((\muparrow{}e \mmember{}\msubb{} Encrypt) \mwedge{} (a = cipherText(e)) \mwedge{} (\mexists{}b\mmember{}ns. (\mneg{}(b = a)) \mwedge{} (e has b))))))
\mwedge{} (\mforall{}e:E(Send). ((loc(e) \mmember{} C) {}\mRightarrow{} (\mneg{}(e has a))))
\mwedge{} (\mforall{}e:E(Encrypt)
((loc(e) \mmember{} C)
{}\mRightarrow{} (e has a)
{}\mRightarrow{} ((\mexists{}A\mmember{}C. key(e) = PublicKey(A))
\mvee{} (\mexists{}k\mmember{}ns. key(e) = symmetric-key(k))
\mvee{} (cipherText(e) \mmember{} ns)))))@i
9. PropertyF
10. e : E@i
11. \mforall{}e1:E. ((e1 < e) {}\mRightarrow{} (\mexists{}a\mmember{}ns. (e1 has a)) {}\mRightarrow{} (loc(e1) \mmember{} C))
12. a : Atom1
13. (a \mmember{} ns)
14. (e has a)
\mvdash{} (loc(e) \mmember{} C)
By
Latex:
Assert \mkleeneopen{}\mforall{}x,y:E. \mforall{}a:Atom1.
(ses-flow(s;es;a;x;y) {}\mRightarrow{} y c\mleq{} e {}\mRightarrow{} (a \mmember{} ns) {}\mRightarrow{} (loc(x) \mmember{} C) {}\mRightarrow{} (loc(y) \mmember{} C))\mkleeneclose{}\mcdot{}
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